From 59a415a51c2c9c5b175b5ef0fe8c2037b4fa85a6 Mon Sep 17 00:00:00 2001
From: Markus Quaritsch <markus.quaritsch@tugraz.at>
Date: Fri, 16 Jul 2021 15:51:35 +0200
Subject: [PATCH] updating user manual

---
 .../Engine_FC_Correction.md                   |  44 +-
 Documentation/User Manual/help.html           | 967 +++++++++++-------
 2 files changed, 597 insertions(+), 414 deletions(-)

diff --git a/Documentation/User Manual/3-simulation-models/Engine_FC_Correction.md b/Documentation/User Manual/3-simulation-models/Engine_FC_Correction.md
index 4dbbb1a858..24da105a2d 100644
--- a/Documentation/User Manual/3-simulation-models/Engine_FC_Correction.md	
+++ b/Documentation/User Manual/3-simulation-models/Engine_FC_Correction.md	
@@ -32,14 +32,15 @@ $\textrm{E\_aux\_ESS\_mech\_ICEon\_standstill} = \sum_{\forall \textrm{v\_act}_i
 $\textrm{E\_aux\_ESS\_mech\_ICEon\_driving} = \sum_{\forall \textrm{v\_act}_i > 0}{\textrm{P\_aux\_ESS\_mech\_ICE\_on} \cdot dt}$
 
 
-$\begin{align*}
+$$
+\begin{align*}
 \textbf{\textrm{FC\_ESS}} =\, &  \textrm{FC\_ICE\_start} + \\
      &  \textrm{E\_aux\_ESS\_mech\_ICEoff\_standstill} \cdot k_\textrm{engline} \cdot \textrm{UF}_\textrm{standstill}  + \\
-     &  (\textrm{E\_aux\_ESS\_mech\_ICEon\_standstill} \cdot k_\textrm{engline} + \textrm{FC}(n_\textrm{idle}, 0) \cdot \textrm{t\_ICEoff\_standstill}) \cdot (1 – \textrm{UF}_\textrm{standstill}) \\
+     &  (\textrm{E\_aux\_ESS\_mech\_ICEon\_standstill} \cdot k_\textrm{engline} + \textrm{FC}(n_\textrm{idle}, 0) \cdot \textrm{t\_ICEoff\_standstill}) \cdot (1 - \textrm{UF}_\textrm{standstill}) \\
      &   \textrm{E\_aux\_ESS\_mech\_ICEoff\_driving} \cdot k_\textrm{engline} \cdot \textrm{UF}_\textrm{driving} + \\
-     &  (\textrm{E\_aux\_ESS\_mech\_ICEon\_driving} \cdot k_\textrm{engline} + \textrm{FC}(n_\textrm{idle}, 0) \cdot \textrm{t\_ICEoff\_driving}) \cdot (1 – \textrm{UF}_\textrm{driving})
+     &  (\textrm{E\_aux\_ESS\_mech\_ICEon\_driving} \cdot k_\textrm{engline} + \textrm{FC}(n_\textrm{idle}, 0) \cdot \textrm{t\_ICEoff\_driving}) \cdot (1 - \textrm{UF}_\textrm{driving})
 \end{align*}
-$
+$$
 
 
 ####Bus Auxiliaries Correction -- Electric System
@@ -50,7 +51,7 @@ $\textrm{E\_BusAux\_ES\_consumed} = \sum{\textrm{P\_BusAux\_ES\_consumed} \cdot
 
 $\textrm{E\_BusAux\_ES\_gen} =  \sum{\textrm{P\_BusAux\_ES\_gen} \cdot dt}$
 
-$\Delta\textrm{E\_BusAux\_ES\_mech} = (\textrm{E\_BusAux\_ES\_consumed} – \textrm{E\_BusAux\_ES\_gen}) / \textrm{AlternatorEfficiency} / \textrm{AlternatorGearEfficiency}$
+$\Delta\textrm{E\_BusAux\_ES\_mech} = (\textrm{E\_BusAux\_ES\_consumed} - \textrm{E\_BusAux\_ES\_gen}) / \textrm{AlternatorEfficiency} / \textrm{AlternatorGearEfficiency}$
 
 $\textbf{\textrm{FC\_BusAux\_ES}} = \textrm{E\_BusAux\_ES} \cdot k_\textrm{engline}$
 
@@ -78,7 +79,7 @@ $\textrm{E\_busAux\_PS\_alwaysOn} =  \sum_{\textrm{Nl\_busAux\_consumed}_i = \te
 
 $\textrm{Nl\_alwaysOn} =  \sum_{\textrm{Nl\_busAux\_consumed}_i = \textrm{Nl\_busAux\_gen}_i}{\textrm{Nl\_busAux\_gen\_max}}$
 
-$k_\textrm{Air} = \frac{\textrm{E\_busAux\_PS\_alwaysOn} – \textrm{E\_busAuxPS\_drag}}{\textrm{Nl\_alwaysOn} – 0}$
+$k_\textrm{Air} = \frac{\textrm{E\_busAux\_PS\_alwaysOn} - \textrm{E\_busAuxPS\_drag}}{\textrm{Nl\_alwaysOn} - 0}$
 
 
 ![](pics/BusAux_PS_kAir.png)
@@ -87,23 +88,24 @@ $\textrm{CorrectedAirDemand} = \textrm{[Calculate Air demand with actual cycle t
 
 $\textrm{AirGenerated} =  \sum{\textrm{Nl\_busAux\_PS\_gen}}$
 
-$\Delta\textrm{Air} = \textrm{CorrectedAirDemand} – \textrm{AirGenerated}$
+$\Delta\textrm{Air} = \textrm{CorrectedAirDemand} - \textrm{AirGenerated}$
 
 $\textrm{E\_busAux\_PS\_corr} = \Delta\textrm{Air} \cdot k_\textrm{Air}$
 
 $\textrm{FC\_BusAux\_PS\_AirDemand} = \textrm{E\_busAux\_PS\_corr} \cdot k_\textrm{engline}$
 
-$\textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_driving} = \textrm{P\_PS\_drag}(n_\textrm{idle}) \cdot k_\textrm{engline} \cdot \textrm{t\_ICEoff\_driving} \cdot (1 – \textrm{UF}_\textrm{driving})$
+$\textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_driving} = \textrm{P\_PS\_drag}(n_\textrm{idle}) \cdot k_\textrm{engline} \cdot \textrm{t\_ICEoff\_driving} \cdot (1 - \textrm{UF}_\textrm{driving})$
 
-$\textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_standstill} = \textrm{P\_PS\_drag}(n_\textrm{idle}) \cdot k_\textrm{engline} \cdot \textrm{t\_ICEoff\_standstill} \cdot (1 – \textrm{UF}_\textrm{standstill})$
+$\textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_standstill} = \textrm{P\_PS\_drag}(n_\textrm{idle}) \cdot k_\textrm{engline} \cdot \textrm{t\_ICEoff\_standstill} \cdot (1 - \textrm{UF}_\textrm{standstill})$
 
 
-$\begin{align*}
+$$
+\begin{align*}
 \textbf{\textrm{FC\_BusAux\_PS}} =\, &   \textrm{FC\_BusAux\_PS\_AirDemand}  + \\
  & \textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_driving} + \\
  & \textrm{FC\_busAux\_PS\_Drag\_ICEoff\_standstill} \\
 \end{align*}
-$
+$$
 
 
 ####Bus Auxiliaries Correction -- Aux Heater
@@ -124,12 +126,13 @@ $\textrm{E\_WHR\_mech} = \sum{\textrm{P\_WHR\_mech} \cdot dt}$
 
 $\textrm{E\_WHR\_el} = \sum{\textrm{P\_WHR\_el} \cdot dt}$
 
-$\textrm{E\_WHR\_el\_mech} = \begin{cases}
+$$
+\textrm{E\_WHR\_el\_mech} = \begin{cases}
 \textrm{E\_WHR\_el} / \textrm{AlternatorEfficiency} & if conventional truck \\
 \textrm{E\_WHR\_el} / \eta_{\textrm{EM}_\textrm{chg}} & if bus with ES connected to REES and smart alternator \\
 \textrm{E\_WHR\_el} / \textrm{BusAlternatorEfficiency} & otherwise
 \end{cases}
-$
+$$
 
 $\textbf{\textrm{FC\_WHR}} = - (\textrm{E\_WHR\_mech} + \textrm{E\_WHR\_el\_mech}) \cdot k_\textrm{engline}$
 
@@ -138,13 +141,22 @@ $\textbf{\textrm{FC\_WHR}} = - (\textrm{E\_WHR\_mech} + \textrm{E\_WHR\_el\_mech
 
 If the REESS Soc at the end of the simulation is higher than the initial SoC the correction is done according to:
 
-$\textbf{\textrm{FC\_SoC}} = -\frac{\Delta\textrm{E\_REESS} \cdot k_\textrm{engline}}{\eta_{\textrm{EM}_\textrm{chg}} \cdot \eta_{\textrm{REESS}_\textrm{chg}}} $
-
+$$
+\textbf{\textrm{FC\_SoC}} = -\frac{\Delta\textrm{E\_REESS} \cdot k_\textrm{engline}}{\eta_{\textrm{EM}_\textrm{chg}} \cdot \eta_{\textrm{REESS}_\textrm{chg}}} 
+$$
 
 
 If the REESS Soc at the end of the simulation is lower than the initial SoC the correction is done according to:
 
-$\textbf{\textrm{FC\_SoC}} = - \Delta\textrm{E\_REESS} \cdot k_\textrm{engline} \cdot \eta_{\textrm{EM}_\textrm{dischg}} \cdot \eta_{\textrm{REESS}_\textrm{dischg}} $
+$$
+\textbf{\textrm{FC\_SoC}} = - \Delta\textrm{E\_REESS} \cdot k_\textrm{engline} \cdot \eta_{\textrm{EM}_\textrm{dischg}} \cdot \eta_{\textrm{REESS}_\textrm{dischg}} 
+$$
+
+
+$\eta_{\textrm{REESS}_\textrm{chg}} = \frac{\textrm{E\_REESS\_INT\_CHG}}{\textrm{E\_REEES\_T\_CHG}}$
+
+$\eta_{\textrm{REESS}_\textrm{dischg}} = \frac{\textrm{E\_REESS\_INT\_DISCHG}}{\textrm{E\_REEES\_T\_DISCHG}}$
+
 
 
 ###Engine-Line Approach
diff --git a/Documentation/User Manual/help.html b/Documentation/User Manual/help.html
index 92bfe348b0..b1ae5973f1 100644
--- a/Documentation/User Manual/help.html	
+++ b/Documentation/User Manual/help.html	
@@ -1866,21 +1866,16 @@ Example: “Gears\Gear1.vtlm” points to the “Gears” subdirectory of the Ge
 <p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="E_{ICE,start} = E_{ICE,rampUp} / \eta_{alternator}^2" title="E_{ICE,start} = E_{ICE,rampUp} / \eta_{alternator}^2" /></p>
 <p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="E_{ICE,start}" title="E_{ICE,start}" /> is the amount of energy the combustion engine needs to provide to compensate the start up is the ramp-up energy multiplied by the efficiency of the alternator. <img style="vertical-align:middle" src="data:image/png;base64,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" alt="t_{ICE,start}" title="t_{ICE,start}" /> is assumed to be 1 second and <img style="vertical-align:middle" src="data:image/png;base64,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" alt="\eta_{alternator}" title="\eta_{alternator}" /> is 0.7.</p>
 </div>
-<div id="utility-factor" class="section level3">
-<h3>Utility Factor</h3>
-<p>Engine Stop/Start is usually not activated at every vehicle stop. This is considered in VECTO via a utility factor (e.g. 0.8). This utility factor (f) is applied for every engine stop as follows:</p>
-<ul>
-<li>the auxiliary demand during engine stops is multiplied by the utility factor</li>
-<li>the fuel consumption FC_final during engine stop is the fuel consumption with the engine idling and all auxiliaires on multiplied by 1-f</li>
-<li>the energy demand for starting the engine is multiplied by the utility factor</li>
-</ul>
+<div id="auxiliaries-and-utility-factor" class="section level3">
+<h3>Auxiliaries and Utility Factor</h3>
+<p>During ICE-off phases the ICE is fully shut of in the simulation (.vmod data). However, in reality the ICE is not always switched off due to certain boundary conditions (e.g. power demand from an auxiliary, temperature, etc.). This is considered in the <a href="#engine-fuel-consumption-correction">post-processing</a>. Therefore, the demand for different auxiliaries is balanced in separate columns in the <a href="#modal-results-.vmod">.vmod</a> file for the two cases a) ICE is really off, and b) ICE would be on. This is done for the mechanical auxiliaries, bus-aux electric demand (all different cases like ES connected to the REESS, smart ES, conventional ES, and combinations thereof), bus-aux pneumatic system. A detailed description which auxiliary power demand is balanced in which columns can be found in <a href="BusAuxCases%20with%20ESS_Formatted.xlsx">this spreadsheet</a> for all combinations of conventional vehicles, bus auxiliaries, and hybrid vehicles.</p>
 <div class="declaration">
 <p><strong>Auxiliary energy demand</strong></p>
 <p>In Declaration Mode the energy demand of all auxiliaries except the engine cooling fan and the steering pump is considered during vehicle stops.</p>
 </div>
 <div class="engineering">
 <p><strong>Auxiliary energy demand</strong></p>
-<p>In Engineering Mode the energy demand of all auxiliaries is assumed to be drawn also during engine-off periods and the fuel consumption is corrected in a post-processing step.</p>
+<p>In Engineering Mode the energy demand of the auxiliaries can be specified for the cases: - ICE on - ICE off, vehicle standstill - ICE off, vehicle driving</p>
 </div>
 </div>
 </div>
@@ -1971,7 +1966,7 @@ Example: “Gears\Gear1.vtlm” points to the “Gears” subdirectory of the Ge
 <ol style="list-style-type: decimal">
 <li>In a preprocessing step the road gradient where the vehicle would accelerate on its own is computed for certain velocities. If the vehicle is equipped with eco-roll the powertrain is declutched, otherwise the engine is in full drag. The slope is calculated for every simulated cycle as this values vary with the vehicle’s payload, rolling resistance and air drag.</li>
 <li>All positions in the driving cycle where the slope is lower than the road gradient required that the vehicle accelerates on its own are marked as potential candidates for PCC events. At this distance the vehicle’s velocity shall be a minimum. Denoted as <img style="vertical-align:middle" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACIAAAANBAMAAAA+k6ESAAAALVBMVEX///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAADAOrOgAAAADnRSTlMARFSZImYQMrvddqvNiR1MEkMAAAAJcEhZcwAADsQAAA7EAZUrDhsAAACFSURBVAgdY2AQMhE1Y0AG7AoVARORBRi4GOoSAlBEGBhWo/EZGA6hiTCyPGNYwLohEyEcyTqN1SFgGg/TBpiYr4qsOgPLAVbGBTARMM21gIm3AEWEV0GMg4F94YJUgxApiASLqQAHQwbDNheDBla40toCWYYDrAIHSuAivgK8Ug4si4wEAObGF0JnApkOAAAAAElFTkSuQmCC" alt="x_{v_{low}}" title="x_{v_{low}}" />.</li>
-<li>For every potential PCC event, the end position is marked in the driving cycle. This is the first position in the driving cycle after <img style="vertical-align:middle" src="data:image/png;base64,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" alt="x_v_{low}}" title="x_v_{low}}" /> where the slope is greater than the road gradient required that the vehicle accelerates on its own. Latest at this position the vehicle shall reach the target velocity again. Denoted as <img style="vertical-align:middle" src="data:image/png;base64,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" alt="x_{end, max}" title="x_{end, max}" /></li>
+<li>For every potential PCC event, the end position is marked in the driving cycle. This is the first position in the driving cycle after <img style="vertical-align:middle" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACIAAAANBAMAAAA+k6ESAAAALVBMVEX///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAADAOrOgAAAADnRSTlMARFSZImYQMrvddqvNiR1MEkMAAAAJcEhZcwAADsQAAA7EAZUrDhsAAACFSURBVAgdY2AQMhE1Y0AG7AoVARORBRi4GOoSAlBEGBhWo/EZGA6hiTCyPGNYwLohEyEcyTqN1SFgGg/TBpiYr4qsOgPLAVbGBTARMM21gIm3AEWEV0GMg4F94YJUgxApiASLqQAHQwbDNheDBla40toCWYYDrAIHSuAivgK8Ug4si4wEAObGF0JnApkOAAAAAElFTkSuQmCC" alt="x_{v_{low}}" title="x_{v_{low}}" /> where the slope is greater than the road gradient required that the vehicle accelerates on its own. Latest at this position the vehicle shall reach the target velocity again. Denoted as <img style="vertical-align:middle" src="data:image/png;base64,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" alt="x_{end, max}" title="x_{end, max}" /></li>
 <li>For every potential PCC event, the earliest start position is marked. This is calculated as <img style="vertical-align:middle" src="data:image/png;base64,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" alt="x_{start} = x_{v_{low}} - d_{preview}" title="x_{start} = x_{v_{low}} - d_{preview}" />.</li>
 <li>For every potential PCC event, the vehicle’s energy is calculated: <img style="vertical-align:middle" src="data:image/png;base64,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" alt="E(x_{v_{low}}) = m \cdot g \cdot h(x_{v{low}}) + \frac{m \cdot (v_{target}(x_{v_{low}}) - v_{neg})^2}{2}" title="E(x_{v_{low}}) = m \cdot g \cdot h(x_{v{low}}) + \frac{m \cdot (v_{target}(x_{v_{low}}) - v_{neg})^2}{2}" /> <img style="vertical-align:middle" src="data:image/png;base64,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" alt="E(x_{end, max}) = m \cdot g \cdot h(x_{end, max}) + \frac{m \cdot v_{target}(x_{end, max})^2}{2}" title="E(x_{end, max}) = m \cdot g \cdot h(x_{end, max}) + \frac{m \cdot v_{target}(x_{end, max})^2}{2}" /></li>
 </ol>
@@ -2317,24 +2312,129 @@ Example: “Gears\Gear1.vtlm” points to the “Gears” subdirectory of the Ge
 <p>The final fuel consumption is corrected in a post-processing to reflect systems not directly modeled in VECTO (e.g. electric waste heat recovery sysmtes) or to account for systems not active all the time for different reasons (e.g., engine stop-start).</p>
 <div id="engine-stopstart-correction" class="section level3">
 <h3>Engine Stop/Start Correction</h3>
-<p>As the energy demand of auxiliaries is modeled as an average power demand over the whole simulated cycle, the energy demand of certain auxiliaries during engine-off periods needs to be compensated during engine-on periods. This is done using the <a href="##engine-line-approach">Engine-Line approach</a>. The energy demand of the auxiliaries that shall be active also during engine-off periods as well as the energy demand for starting the engine is accumulated (see <a href="#advanced-driver-assistant-systems-engine-stopstart">Engine Stop/Start</a>, <a href="#advanced-driver-assistant-systems-eco-roll">Eco-Roll with Engine Stop/Start</a>, and <a href="#advanced-driver-assistant-systems-predictive-cruise-control">PCC with Eco-Roll and Engine Stop/Start</a>) during the simulation. The final fuel consumption is corrected for this “missing” energy</p>
-</div>
-<div id="bus-auxiliaries-correction" class="section level3">
-<h3>Bus Auxiliaries Correction</h3>
-<p><strong>Electric System</strong></p>
-<p>In case smart electrics are used the electric energy generated may be different from the electric energy consumed as the smart alternator may generate more electric power in drag situations. Moreover, the state of charge of a battery may be different at the end of the simulated cycle than at the beginning and thus the fuel consumption needs to be corrected.</p>
-<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\Delta E_\textrm{ES} = E_\textrm{ES,consumed} - E_\textrm{ES,generated} + (\textrm{SOC}_\textrm{start} - \textrm{SOC}_\textrm{end}) * \textrm{Capacity}_{\textrm{RESS}}" title="\Delta E_\textrm{ES} = E_\textrm{ES,consumed} - E_\textrm{ES,generated} + (\textrm{SOC}_\textrm{start} - \textrm{SOC}_\textrm{end}) * \textrm{Capacity}_{\textrm{RESS}}" /></p>
-<p><img style="vertical-align:middle" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAR0AAAAUCAMAAACHzBk1AAAAM1BMVEX///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAADxgEwMAAAAEHRSTlMAid3vmau7RHYyVGYizRBO9rH5EwAAAAlwSFlzAAAOxAAADsQBlSsOGwAAA7lJREFUWAnVV4uSnCAQBAV5Svz/r003gx63Gr3jNqkKVQsqQ8+DnoFV6n9o5m1GDiDpaTZaazsPrB20u6zdwif9WXfCP3ocQlqWqtP9u+joLXVuPujXuZP90eMQ0uZFZxt+ZMCXFhe/zJ3gg37Zu05++HEEKWxB9MVhtd9c6FXoyPOgP7xt04aQ/AbneqZ/09dvixf425HnQb95W2INITHts/22j+MLSIaOPA/6azokn0pKtpF8UPUQ0rxovb7tXPhkubFH+1BA6vTkudfvyOrswowxjhSOw6AhpMyyExxAgplT8hYmOJ3ShzsH/vEQJsoPNl+48CDPg35L6ajShCG16Iypv0KiJWxEvERNLDukbFSOJiijCvNsrU7ww0Uz49ER6gC/HVsP+lvKG26W3XeM6uNdml1NXiLtvhHxyinbbmY5InqME0YCpb8UHaEO+NmOrXv9sR2kM7ejdvSHfix30bmYvEYiGtufojO3DcFdkNGpV8LZ0hg2N6Woo4sLYhVTQvIHjaQzHsknEvUdc9FDOGpfO5lSF3Vnp85Bnnv9bcMzCc7Ox+aHW2lANampTdHgSxXYJ3ebaM4LkpvgB64Wa1SabjfuVMA4Y6IWj7xJIDSChNLna2pnO+9XNFJ6y8onFTBlSwHUmg3STzgn72RbMMr6EqRr4TkPOobWfCXPvf6a4wBJVMYO2pGR9IUHmJgkGmEoTRKBOtnZpKRa9EgWrFyiMhgaIlAbIAJfSFq9bvVP1rSBHOQO2YHveBbmcjX2LHmlrXPW+Uquhgk5eccuUIwapcN43bauQd2D/tQ4jM0BMFlewlSO6IhJonE3qQowOr1NcOAViemR7Et0GmBeLy6AjA6PT8cLGLMIrSlFdEw9icmx4yue5H23hBEdv5Wc9bdDiiql7NhUPqKTxSTR2AwVAdiQe5tAE8GQngXsMjoNENkh3veL5MzSxTECuFkySHt0dGVdzgHsLbl9hYC8M7OcFTPHo/OqX+X+jzHLTsKHubTakwMTIec+OocAJjubzkiVcItDnVLuc2YBEHcHyZwuOtlsqLtmUw5DQpIsrFq2+C3mZc0K5RkRZd++UmD/6pMGpxHS2nWoX3886Ve+t5Flp9gYvfkFo1DmduWiVgwVgSyTh00oAK9IyprIfM3G4fSkQ/w1bxSr6WNjGbltjwK3qx8nP6WDr5n9uOZa4Ix0HMuXC86JdRZrlew8sX95FNgFx0am9nvaGekmOj7Hu8tes+iRGY8C73Htb6CEqf6zuIROcsD9BmjFIv9wFM5gAAAAAElFTkSuQmCC" alt="E_\textrm{ES,mech,corr} = \Delta E_\textrm{ES} / \eta_\textrm{alternator} / \eta_\textrm{pulley}" title="E_\textrm{ES,mech,corr} = \Delta E_\textrm{ES} / \eta_\textrm{alternator} / \eta_\textrm{pulley}" /></p>
-<p><strong>Pneumatic System</strong></p>
-<p>In case of smart pneumatics the total air generated may be different from the total air consumed by all pneumatic consumers as the smart compressor generates more compressed air in drag situations. The fuel energy difference is corrected according to the following equations:</p>
-<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\Delta \textrm{Air} = \textrm{Air}_\textrm{consumed,total} - \textrm{Air}_\textrm{generated,total}" title="\Delta \textrm{Air} = \textrm{Air}_\textrm{consumed,total} - \textrm{Air}_\textrm{generated,total}" /></p>
-<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="k_\textrm{Air} = (E_\textrm{PS,generated} - E_\textrm{PS,off}) / (\textrm{Air}_\textrm{generated,total} - 0)" title="k_\textrm{Air} = (E_\textrm{PS,generated} - E_\textrm{PS,off}) / (\textrm{Air}_\textrm{generated,total} - 0)" /></p>
-<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="E_\textrm{PS,corr} = k_\textrm{Air} * \Delta \textrm{Air}" title="E_\textrm{PS,corr} = k_\textrm{Air} * \Delta \textrm{Air}" /></p>
-<p><strong>Aux Heater</strong></p>
+<p>As the energy demand of auxiliaries is modeled as an average power demand over the whole simulated cycle, the demand of certain auxiliaries during engine-off periods needs to be compensated during engine-on periods. This is done using the <a href="#engine-line-approach">Engine-Line approach</a>.</p>
+<p>During the simulation the combustion engine is allways off. In this phases the “missing” auxiliary demand is balanced in separate colums for the cases a) the ICE is really off, and b) the ICE would be on. This allows for an accurate correction of the fuel consumption taking into account that ESS is in reality not active in all possible cases due to e.g. auxiliary power demand, environmental conditions, etc.</p>
+<p>A general goal is that the actual auxiliary demand matches the target auxiliary demand over the cycle. So in case the ICE is off, some systems still consume electric energy but no electric energy is created during ICE-off phases. Or in case of bus auxiliaries the total air demand is pre-calculated and thus leading to an average air demand over the cycle. During ICE-off phases, however, no compressed air is generated. This ‘missing’ compressed air is corrected in the post-processing.</p>
+<p>A utility factor (UF) considers that the ICE is not off in all cases. Therefore the fuel consumption for compensating the missing auxiliary demand consists of two parts. The first part considers the fuel consumption required for the ‘missing’ auxiliary demand if the ICE is really off. Here the according auxiliary energy demand is multiplied by the utility factor and the engine line. The second part considers the fuel consumption in case the ICE would not be switched off. Here the ‘missing’ auxiliary energy demand is multiplied by (1 - utility factor) and the engine line and the idle fuel consumption is added for time periods the ICE would be on.</p>
+<p>For the post-processing two different utility factors are considered. One for ICE-off phases during vehicle standstill and one for ICE-off phases during driving.</p>
+<div id="ice-start" class="section level4">
+<h4>ICE Start</h4>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_ICE\_start} = \sum{\textrm{P\_ICE\_start} \cdot dt}" title="\textrm{E\_ICE\_start} = \sum{\textrm{P\_ICE\_start} \cdot dt}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{FC\_ICE\_start} = \textrm{E\_ICE\_start} \cdot k_\textrm{engline}" title="\textrm{FC\_ICE\_start} = \textrm{E\_ICE\_start} \cdot k_\textrm{engline}" /></p>
+</div>
+<div id="mechanical-auxiliaries" class="section level4">
+<h4>Mechanical Auxiliaries</h4>
+<p><img style="vertical-align:middle" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAkAAAAApBAMAAAAv0Iu+AAAAMFBMVEX///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAv3aB7AAAAD3RSTlMAIondmbvvMs0QZnarVESUG+88AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAGl0lEQVRoBe1ab2wTZRj/Xdfuete1q5igAXWXMkOcko1PGj9AXVTCBNaYqJEPUmNC/BdWYOMDEDf5ot+8TEIUYnbgFsLGXEXQOJhUYiASZA1oMMCkmkWNIaGdg6VhUJ/3vbtyt3aYuMY12b1k7/s8v+fe5/3d794/tx1A2ZaWG+tZacnlcqmyJTmbxAau66MLB3OR2eRRtmN7cprBbWembEnOJjGpJa/Lj7PIY97yxtoXi09hI3Sudm8SvCqg2ZbVIWHRuIbAd4/GwtZ0fb3d3QVdOPBn+g7elhHXBe+4Fuva36bjUk0LnS2Ntafyns2YKV9KJg/2NoXNpAavekDsMDF7y0N+BZs1XtmDzJMMgeCiO16lYjSKO+nccXniXqOPYO8r6AKRLp8CGVSTUaS4cuEiKA3QniqCEzQzvizncxjY2JBP/jsklWeFksdsBg0IpUKFS+OVLaY7FoHcEcDHBTLSVatS2uziMw29NQSKA1fvIhA+uGXvxr0vgapoEZygmfFlObPosqQ+Bg9RrIeEAxbUYvIQPV5B45UlYpoWgdpjBDZY0nXB0IFwj9lBb41AhHvTziDsygXt/ZhHArnNYadEZ8aXktETrbHkXItquql6+KBaUIvJQ96XgSCvLBHTNJnSEnuWYWFLOqtAV8wOeqsL5E9zb3qB/LkOez/m3XUG0a38Z76Ue4pAGWwhsB4fsXFpg+pT0JYJrFN7rguvKQzhITF3WgWvCGnL9K/efTAFuXclAnVfIdN7ll3I9qAnuGGku9SXCjSHascUAuWRHrKT6D0Ecd2Cyynq2J9G/8XI6NgStg9OLxCax/Sk1poEqkkyoJR8KZ1/8BuMjoWaQ+ZgR0eiv71fRyqEhnVoCEcgZVCj4nl8zyE9tD1HNHlFEt/EFi0QRQib8RO8IJdfSQIZr3W8j09BE61mfaJsQhVb2b6kL4KuuBjFQchpUUGCbVG0dg2BVp2hcsJkp7cVRd6hj/ce1U+xEvJlox2CW7POII9WlcBaCtTDpbN5DO18x1Sx6y99zRkhsVmjk45VwG10paQs6VgR24D5Krn8UhLodRY20hFYkxfo56DIBHIlxDSqWecJUs7/LmJ2gfTu9lrIvWEHyDtuIiXkSynpQBbShkDC4wT0oCpOD4/dkZ/+sSIMGAIFNnBfD9EJ7e7gFQPZ45ay/lsj5y+w/YdcU6CTLJzS+1yhqZEyZ1DVjW+ZQMACEiiIbIBRwfDbwX8XCAOTrKOt5AUqIV8agG2Itw2BRHb/b6IyRmuFCUTLmX7wwOIadsf09IUXmG+E6IQWG3jFIKaIlJUpG92nTSB+isX1dDaB8OCw2oWgcGKjIVCaCSRczkppwbLEWPaCUlV40OcFKiFfGtcqEKMhZGhBuRJkMYF+oR+SrEYkAWgP8nnjDNBDXtIiwSsG6QIJJM7HE4BqmUHuCCmZ0vtQjnYSRd+D9sKd7FK1Sk1Ix9gMovUppOUgVpPQFoGK7UHwKjSmveQFKiFfGoFuSaRHlj/maT84EvBqn3AVpKV0BW0NV3ZjGQZiCEv6GiPtpKXVCjwxXjGiNMNoiaER/uDDkIPMZTDtQexNeoGRzqXQO6kpUDdcJIzWFfNnNVqfGRyDLyuHsRgZq0AsTUE5U4DwJ8DQUvJl+UJwxy0CISrtkCticcxraQydTFfncunuzxauwWhv+ytfTIjrV9JfYfSQq/PQCvCKLhqf/KP57PbJmDy4H3Ld/lbmEpzhv4s1DiaNdOjblwwMr7g6rlHwZn8//KdjctOvh+nq1smUPDRyfevgxSQu7xebT/EcjGGR4usoADuXryasxHxZOnlwCa6OvzPcZAw5OtJ6wD/EH38BibIBzqtlQ6UsiYivliWt8iE1P1U+XMqSyZMmK+NV1nSdVlfAo5hKTPN3NzM8V9tnzBvfedu0nNaigHHGSw/15KIW2DFNBa7Rq5hRFBNzWosCh5/OF+d1yKKLYzoKOAo4CsyqAgrwdXEC2y4Vx+cY+gj7emQpF/J2RNby9hw2FiKQtN7+S6YTSIgR057Lradxkf8tcRlJMLQGm/YFdmiGGr4wfTNyCuRYJ+okNokaKqUGb5B9BZNCVDrDQtTRhxQIf477+XcWafOeMEACxbkuzgwypocShncrs09/2KmQQPRRjpdAIuDsQUyJ7UnI71Erhyv3dEjBNfftDvMlpnY4pxifKez/ykTow0X2h0tPnbuI1vg9YY5j2zm9deopCrg2TgEc166A+4Dd/z+9fwAdMdw2VNGwKwAAAABJRU5ErkJggg==" alt="\textrm{E\_aux\_ESS\_mech\_ICEoff\_standstill} = \sum_{\forall \textrm{v\_act}_i = 0}{\textrm{P\_aux\_ESS\_mech\_ICE\_off} \cdot dt}" title="\textrm{E\_aux\_ESS\_mech\_ICEoff\_standstill} = \sum_{\forall \textrm{v\_act}_i = 0}{\textrm{P\_aux\_ESS\_mech\_ICE\_off} \cdot dt}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_aux\_ESS\_mech\_ICEoff\_driving} = \sum_{\forall \textrm{v\_act}_i &gt; 0}{\textrm{P\_aux\_ESS\_mech\_ICE\_off} \cdot dt}" title="\textrm{E\_aux\_ESS\_mech\_ICEoff\_driving} = \sum_{\forall \textrm{v\_act}_i &gt; 0}{\textrm{P\_aux\_ESS\_mech\_ICE\_off} \cdot dt}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_aux\_ESS\_mech\_ICEon\_standstill} = \sum_{\forall \textrm{v\_act}_i = 0}{\textrm{P\_aux\_ESS\_mech\_ICE\_on} \cdot dt}" title="\textrm{E\_aux\_ESS\_mech\_ICEon\_standstill} = \sum_{\forall \textrm{v\_act}_i = 0}{\textrm{P\_aux\_ESS\_mech\_ICE\_on} \cdot dt}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_aux\_ESS\_mech\_ICEon\_driving} = \sum_{\forall \textrm{v\_act}_i &gt; 0}{\textrm{P\_aux\_ESS\_mech\_ICE\_on} \cdot dt}" title="\textrm{E\_aux\_ESS\_mech\_ICEon\_driving} = \sum_{\forall \textrm{v\_act}_i &gt; 0}{\textrm{P\_aux\_ESS\_mech\_ICE\_on} \cdot dt}" /></p>
+<p><br /><img style="vertical-align:middle" src="data:image/png;base64,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" alt="
+\begin{align*}
+\textbf{\textrm{FC\_ESS}} =\, &amp;  \textrm{FC\_ICE\_start} + \\
+     &amp;  \textrm{E\_aux\_ESS\_mech\_ICEoff\_standstill} \cdot k_\textrm{engline} \cdot \textrm{UF}_\textrm{standstill}  + \\
+     &amp;  (\textrm{E\_aux\_ESS\_mech\_ICEon\_standstill} \cdot k_\textrm{engline} + \textrm{FC}(n_\textrm{idle}, 0) \cdot \textrm{t\_ICEoff\_standstill}) \cdot (1 - \textrm{UF}_\textrm{standstill}) \\
+     &amp;   \textrm{E\_aux\_ESS\_mech\_ICEoff\_driving} \cdot k_\textrm{engline} \cdot \textrm{UF}_\textrm{driving} + \\
+     &amp;  (\textrm{E\_aux\_ESS\_mech\_ICEon\_driving} \cdot k_\textrm{engline} + \textrm{FC}(n_\textrm{idle}, 0) \cdot \textrm{t\_ICEoff\_driving}) \cdot (1 - \textrm{UF}_\textrm{driving})
+\end{align*}
+" title="
+\begin{align*}
+\textbf{\textrm{FC\_ESS}} =\, &amp;  \textrm{FC\_ICE\_start} + \\
+     &amp;  \textrm{E\_aux\_ESS\_mech\_ICEoff\_standstill} \cdot k_\textrm{engline} \cdot \textrm{UF}_\textrm{standstill}  + \\
+     &amp;  (\textrm{E\_aux\_ESS\_mech\_ICEon\_standstill} \cdot k_\textrm{engline} + \textrm{FC}(n_\textrm{idle}, 0) \cdot \textrm{t\_ICEoff\_standstill}) \cdot (1 - \textrm{UF}_\textrm{standstill}) \\
+     &amp;   \textrm{E\_aux\_ESS\_mech\_ICEoff\_driving} \cdot k_\textrm{engline} \cdot \textrm{UF}_\textrm{driving} + \\
+     &amp;  (\textrm{E\_aux\_ESS\_mech\_ICEon\_driving} \cdot k_\textrm{engline} + \textrm{FC}(n_\textrm{idle}, 0) \cdot \textrm{t\_ICEoff\_driving}) \cdot (1 - \textrm{UF}_\textrm{driving})
+\end{align*}
+" /><br /></p>
+</div>
+<div id="bus-auxiliaries-correction-electric-system" class="section level4">
+<h4>Bus Auxiliaries Correction – Electric System</h4>
+<p>The bus auxiliaries electric system correction is used for conventional vehicles with ESS and buses with smart electric system in the same way.</p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_BusAux\_ES\_consumed} = \sum{\textrm{P\_BusAux\_ES\_consumed} \cdot dt}" title="\textrm{E\_BusAux\_ES\_consumed} = \sum{\textrm{P\_BusAux\_ES\_consumed} \cdot dt}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_BusAux\_ES\_gen} = \sum{\textrm{P\_BusAux\_ES\_gen} \cdot dt}" title="\textrm{E\_BusAux\_ES\_gen} = \sum{\textrm{P\_BusAux\_ES\_gen} \cdot dt}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\Delta\textrm{E\_BusAux\_ES\_mech} = (\textrm{E\_BusAux\_ES\_consumed} - \textrm{E\_BusAux\_ES\_gen}) / \textrm{AlternatorEfficiency} / \textrm{AlternatorGearEfficiency}" title="\Delta\textrm{E\_BusAux\_ES\_mech} = (\textrm{E\_BusAux\_ES\_consumed} - \textrm{E\_BusAux\_ES\_gen}) / \textrm{AlternatorEfficiency} / \textrm{AlternatorGearEfficiency}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textbf{\textrm{FC\_BusAux\_ES}} = \textrm{E\_BusAux\_ES} \cdot k_\textrm{engline}" title="\textbf{\textrm{FC\_BusAux\_ES}} = \textrm{E\_BusAux\_ES} \cdot k_\textrm{engline}" /></p>
+</div>
+<div id="bus-auxiliaries-correction-electric-system-supply-from-reess" class="section level4">
+<h4>Bus Auxiliaries Correction – Electric System Supply from REESS</h4>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_DCDC\_missing} = \textrm{P\_DCDC\_missing} \cdot dt" title="\textrm{E\_DCDC\_missing} = \textrm{P\_DCDC\_missing} \cdot dt" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_DCDC\_missing\_mech} = \textrm{E\_DCDC\_missing} / \textrm{DCDC\_ConverterEfficiency} / \eta_{\textrm{EM}_\textrm{chg}}" title="\textrm{E\_DCDC\_missing\_mech} = \textrm{E\_DCDC\_missing} / \textrm{DCDC\_ConverterEfficiency} / \eta_{\textrm{EM}_\textrm{chg}}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textbf{\textrm{FC\_DCDCMissing}} = \textrm{E\_DCDC\_missing\_mech} \cdot k_\textrm{engline}" title="\textbf{\textrm{FC\_DCDCMissing}} = \textrm{E\_DCDC\_missing\_mech} \cdot k_\textrm{engline}" /></p>
+</div>
+<div id="bus-auxiliaries-correction-pneumatic-system" class="section level4">
+<h4>Bus Auxiliaries Correction – Pneumatic System</h4>
+<p>For the pneumatic system the goal of the post-processing correction is that the correct amount of compressed air is generated, even when the ICE is off. As the average air demand is calculated with an estimated cycle driving time, the first step is to correct the air demand using the actual cycle driving time. The missing (or excessive) amout of air is transferred into mechanical energy demand using <img style="vertical-align:middle" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABsAAAAQBAMAAAAVPRmlAAAAMFBMVEX///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAv3aB7AAAAD3RSTlMAMrsQRO+Jq81mdlTdmSINXOHXAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAAj0lEQVQIHWNg1DdgQAauyBwGhnRUbicq9yMKl+UD4ywkATYFQVEkLkeigzUDQyIDA4cASJRfBUSeZWBgBNEM/mIKDAwsU8FsIJHEcISRgYvVgUHGwWfbAoZOhoPcDJxsBQy8DuyLBRgOM+zawLCP8QOIuwGqJXPmSRAXbDYDA/MGhklIXI8ChvzFEgUy9xgAHxcaMf0UT3UAAAAASUVORK5CYII=" alt="k_\textrm{Air}" title="k_\textrm{Air}" />. This value depicts the delta energy demand for a certain delta compressed air. <img style="vertical-align:middle" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABsAAAAQBAMAAAAVPRmlAAAAMFBMVEX///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAv3aB7AAAAD3RSTlMAMrsQRO+Jq81mdlTdmSINXOHXAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAAj0lEQVQIHWNg1DdgQAauyBwGhnRUbicq9yMKl+UD4ywkATYFQVEkLkeigzUDQyIDA4cASJRfBUSeZWBgBNEM/mIKDAwsU8FsIJHEcISRgYvVgUHGwWfbAoZOhoPcDJxsBQy8DuyLBRgOM+zawLCP8QOIuwGqJXPmSRAXbDYDA/MGhklIXI8ChvzFEgUy9xgAHxcaMf0UT3UAAAAASUVORK5CYII=" alt="k_\textrm{Air}" title="k_\textrm{Air}" /> is derived from two points. on the one hand the compressor runs in idle mode, applying only the drag load and producing no compressed air and the second point is that the compressor is always on, applying the always-on mechanical power demand and generating the maximum possible amount of compressed air. The mechanical energy is then corrected using the engineline.</p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_busAux\_PS\_drag} = \sum_{\textrm{Nl\_busAux\_consumed}_i = \textrm{Nl\_busAux\_gen}_i}{\textrm{P\_busAux\_PS\_drag}\cdot dt}" title="\textrm{E\_busAux\_PS\_drag} = \sum_{\textrm{Nl\_busAux\_consumed}_i = \textrm{Nl\_busAux\_gen}_i}{\textrm{P\_busAux\_PS\_drag}\cdot dt}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_busAux\_PS\_alwaysOn} = \sum_{\textrm{Nl\_busAux\_consumed}_i = \textrm{Nl\_busAux\_gen}_i}{\textrm{P\_busAux\_PS\_alwaysOn} \cdot dt}" title="\textrm{E\_busAux\_PS\_alwaysOn} = \sum_{\textrm{Nl\_busAux\_consumed}_i = \textrm{Nl\_busAux\_gen}_i}{\textrm{P\_busAux\_PS\_alwaysOn} \cdot dt}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{Nl\_alwaysOn} = \sum_{\textrm{Nl\_busAux\_consumed}_i = \textrm{Nl\_busAux\_gen}_i}{\textrm{Nl\_busAux\_gen\_max}}" title="\textrm{Nl\_alwaysOn} = \sum_{\textrm{Nl\_busAux\_consumed}_i = \textrm{Nl\_busAux\_gen}_i}{\textrm{Nl\_busAux\_gen\_max}}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="k_\textrm{Air} = \frac{\textrm{E\_busAux\_PS\_alwaysOn} - \textrm{E\_busAuxPS\_drag}}{\textrm{Nl\_alwaysOn} - 0}" title="k_\textrm{Air} = \frac{\textrm{E\_busAux\_PS\_alwaysOn} - \textrm{E\_busAuxPS\_drag}}{\textrm{Nl\_alwaysOn} - 0}" /></p>
+<div class="figure">
+<img 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" />
+
+</div>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{CorrectedAirDemand} = \textrm{[Calculate Air demand with actual cycle time]}" title="\textrm{CorrectedAirDemand} = \textrm{[Calculate Air demand with actual cycle time]}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAATIAAAAaBAMAAADGYM0ZAAAAMFBMVEX///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAv3aB7AAAAD3RSTlMAqxB2ZrvdVCLviZkyRM02CmKXAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAEmUlEQVRIDc1WW2gcVRj+MjNmJ9mZZGuLaDRk3rRPM2K9UKFdzKYRG2weVGyx7FiUvihZQYzUS6YQiPiy+6K0iri2VuhqaRqKohV3XlpsU8gWioiWNBSE6oNN1oRsruN/zpmZvTR5ye5Dfpg53/+f//LNufy7QL3S4h3n4nneSr25GhuveP0i4XDXXGMz150tOeunkPJO3ckammC7FxCKjDY0MXBvOZ/+YM7NltU1kX6n2qx7dmA4AXw8UMDR1feTDtkmp4MJMTYZ1Tqk00u5cy4iufMjNTNclf6jYY+YOWXgPVvA2rcaGtIhEuDsUqXhcRuIod0hm1rDzLQqHRlunYa2giPQXqudYbryEr2u8ZnWKXK2ObzrJYeWWmZtXiqcA55aBOKCmVTDrMeu8ONQzgAP4BDwde0M0+UhJzCnC4BkB1r1eE+o1jKTviyFc4C121mP2ZOVfjyEMcsbZB6uyBDCkZZsgH9kIBZo1eNQqNYyw9BqOEfMmqfWYaamPqvw41Cs2V8GgrNiVHpYURta0pk89rzzL7MbUBJjWnL4rQID+t/Dt5HYCT2fSyGx18AfiTJHP03Uy/qIBkubDZkt957BxZKeNJTBHtocfA+h9sypn/IQYqbOY2LmGR7f+tjJI6zGxVJvJzNY2jLoXKizUddvlTlcgmlpGTCQjv8sp+R+mHQEs5qtxLCPRZ3bQtLBEMlARfe3aHuCczaPtpRUQtq4gibGbMIFV3HAbwjybPejLrQu8Wk5bOU16E5epqyai88ZM4n4vc7rUHCz216QihyYLlpj2jRjZjp4g9S7dhPpBYNHspeFlljArAg9gxLajQ8dDbiKllFwFduviwB5WsSN8259GLt4DazApHk5l9vPmRWB++imnl58eH7wnRRd+2KEAeaDYc5saHDw8E1jDWaKVz6cFiIrZWZqiVNpWrgf2Jk7lfGZ6V8IRoKZA/zC9K34CqyGYE9rjIkCWzOiz25pNKOwD2HMOKC1Ujt+Zcwcto03sQYzdKVoSogF7LdYOF3zIjgz+riRLoNWk3oXVSVVfVE4C2YUconpv310SxwVtszADaCZdUbGrKmfHlul1TMYMw6IWUtcnXZNI542IJmOYFZ1zvCPKMTeVMa0Q2YRtptp41lEU7oLvMqYURq5jdxIBLMpv59aH9BnUw1/zYgMdWJiRnywxcBRGz8h4pChxIFpwHQjxXi7E49m8a4cw26DPKukKVZWCSoZnxm7AXgT+9y9aHVZQzwLrmJUEttJlUkWgVfY+B09rAZbVweTqwb2zPXlH7o2Ewf0jh0pahY7+rR85/hMgYDetQ3K+d+fLkS2uehO0DM4xNOwVIHsCgDoNzNFLZHC2z2v2Pf2GeDPxMTB7t5e/c4tKAMvcPWJZe34GHP4Zom8ceLkty7o/13a+6TAaozP3Mh3llPWgSKH6gguh0ovSyPHymoj0GWnEVkgx4EfGpIpSKKKMxOoGx61fuD2hqPXCmyOB9ZsADY2Xkk852wscp2oA4FdGQ3Q5hijtAlcpHxhczAKWPgt45HryYXAtDlGnRqRL9QxN5PIF0IZaySv/wFJ03ua+JzU1gAAAABJRU5ErkJggg==" alt="\textrm{AirGenerated} = \sum{\textrm{Nl\_busAux\_PS\_gen}}" title="\textrm{AirGenerated} = \sum{\textrm{Nl\_busAux\_PS\_gen}}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\Delta\textrm{Air} = \textrm{CorrectedAirDemand} - \textrm{AirGenerated}" title="\Delta\textrm{Air} = \textrm{CorrectedAirDemand} - \textrm{AirGenerated}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_busAux\_PS\_corr} = \Delta\textrm{Air} \cdot k_\textrm{Air}" title="\textrm{E\_busAux\_PS\_corr} = \Delta\textrm{Air} \cdot k_\textrm{Air}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{FC\_BusAux\_PS\_AirDemand} = \textrm{E\_busAux\_PS\_corr} \cdot k_\textrm{engline}" title="\textrm{FC\_BusAux\_PS\_AirDemand} = \textrm{E\_busAux\_PS\_corr} \cdot k_\textrm{engline}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_driving} = \textrm{P\_PS\_drag}(n_\textrm{idle}) \cdot k_\textrm{engline} \cdot \textrm{t\_ICEoff\_driving} \cdot (1 - \textrm{UF}_\textrm{driving})" title="\textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_driving} = \textrm{P\_PS\_drag}(n_\textrm{idle}) \cdot k_\textrm{engline} \cdot \textrm{t\_ICEoff\_driving} \cdot (1 - \textrm{UF}_\textrm{driving})" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_standstill} = \textrm{P\_PS\_drag}(n_\textrm{idle}) \cdot k_\textrm{engline} \cdot \textrm{t\_ICEoff\_standstill} \cdot (1 - \textrm{UF}_\textrm{standstill})" title="\textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_standstill} = \textrm{P\_PS\_drag}(n_\textrm{idle}) \cdot k_\textrm{engline} \cdot \textrm{t\_ICEoff\_standstill} \cdot (1 - \textrm{UF}_\textrm{standstill})" /></p>
+<p><br /><img style="vertical-align:middle" src="data:image/png;base64,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" alt="
+\begin{align*}
+\textbf{\textrm{FC\_BusAux\_PS}} =\, &amp;   \textrm{FC\_BusAux\_PS\_AirDemand}  + \\
+ &amp; \textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_driving} + \\
+ &amp; \textrm{FC\_busAux\_PS\_Drag\_ICEoff\_standstill} \\
+\end{align*}
+" title="
+\begin{align*}
+\textbf{\textrm{FC\_BusAux\_PS}} =\, &amp;   \textrm{FC\_BusAux\_PS\_AirDemand}  + \\
+ &amp; \textrm{FC\_BusAux\_PS\_Drag\_ICEoff\_driving} + \\
+ &amp; \textrm{FC\_busAux\_PS\_Drag\_ICEoff\_standstill} \\
+\end{align*}
+" /><br /></p>
+</div>
+<div id="bus-auxiliaries-correction-aux-heater" class="section level4">
+<h4>Bus Auxiliaries Correction – Aux Heater</h4>
 <p>The power demand for an additional fuel-fired heater is calculated in the post-processing. The HVAC steaty state model calculates the heating demand (weighted sum of different climatic conditions) and based on the engine’s average waste heat over the cycle the power demand for the aux heater is calculated.</p>
 <p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="E_\textrm{ice,waste heat} = \sum_\textrm{fuels} FC_\textrm{final,sum}(fuel) * NCV_\textrm{fuel}" title="E_\textrm{ice,waste heat} = \sum_\textrm{fuels} FC_\textrm{final,sum}(fuel) * NCV_\textrm{fuel}" /></p>
 <p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\overline{P}_\textrm{ice,waste heat} = E_\textrm{ice, waste heat} / t_\textrm{cycle}" title="\overline{P}_\textrm{ice,waste heat} = E_\textrm{ice, waste heat} / t_\textrm{cycle}" /></p>
-<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="E_{auxHeater} = P_\textrm{HVACSSM,auxHtr}(\overline{P}_\textrm{ice,waste heat}) * t_\textrm{cycle}" title="E_{auxHeater} = P_\textrm{HVACSSM,auxHtr}(\overline{P}_\textrm{ice,waste heat}) * t_\textrm{cycle}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="E_{auxHeater} = \textrm{HVACSSM}_\textrm{AuxHtr}(\overline{P}_\textrm{ice,waste heat}) * t_\textrm{cycle}" title="E_{auxHeater} = \textrm{HVACSSM}_\textrm{AuxHtr}(\overline{P}_\textrm{ice,waste heat}) * t_\textrm{cycle}" /></p>
+</div>
+<div id="waste-heat-recovery-systems" class="section level4">
+<h4>Waste Heat Recovery Systems</h4>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_WHR\_mech} = \sum{\textrm{P\_WHR\_mech} \cdot dt}" title="\textrm{E\_WHR\_mech} = \sum{\textrm{P\_WHR\_mech} \cdot dt}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\textrm{E\_WHR\_el} = \sum{\textrm{P\_WHR\_el} \cdot dt}" title="\textrm{E\_WHR\_el} = \sum{\textrm{P\_WHR\_el} \cdot dt}" /></p>
+<p><br /><img style="vertical-align:middle" src="data:image/png;base64,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" alt="
+\textrm{E\_WHR\_el\_mech} = \begin{cases}
+\textrm{E\_WHR\_el} / \textrm{AlternatorEfficiency} &amp; if conventional truck \\
+\textrm{E\_WHR\_el} / \eta_{\textrm{EM}_\textrm{chg}} &amp; if bus with ES connected to REES and smart alternator \\
+\textrm{E\_WHR\_el} / \textrm{BusAlternatorEfficiency} &amp; otherwise
+\end{cases}
+" title="
+\textrm{E\_WHR\_el\_mech} = \begin{cases}
+\textrm{E\_WHR\_el} / \textrm{AlternatorEfficiency} &amp; if conventional truck \\
+\textrm{E\_WHR\_el} / \eta_{\textrm{EM}_\textrm{chg}} &amp; if bus with ES connected to REES and smart alternator \\
+\textrm{E\_WHR\_el} / \textrm{BusAlternatorEfficiency} &amp; otherwise
+\end{cases}
+" /><br /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAdAAAAAUBAMAAADPfXElAAAAMFBMVEX///8AAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAv3aB7AAAAD3RSTlMAMs3d74lURKsiu3ZmEJlws2FlAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAFwElEQVRYCd1WbWhbVRh+bpvcNOm9TVYnzP3QuzK0jEm64ewUR4ooijraWSN1busVpaJuSzYngn8aRemEjQW1oDJcEEF000YZ+GNCouBQFrdrh/rDj+yHbYc6m7XrbF3b+L7n5ib3xqRK2l++Iee853nP+5zz3PNxL7BIU5OLJFiK9Mb/QNJ80+0td9xJHe9ff9RzjurG4OSNw6GJLiW4sTk0ofmCkzdQ3XKrTrEK1oDB0MiOdxIUUoJr0T0d9ax+uXteHwyNfts5smN7hRRIQ4YD9nbPh3+9518ZpKG4I000BJd6rhgo5y4GEMnBczfwWDvkYIzh+r+A/hmgDhyDf5bqDrgnSil27xOgF5A0xrJJyJQ4CDfl/SICxyvMjToa3L1k3L+Zmwsz+CuRCa6dJa59JdfpsZi98EzS2P0xDjXmDbimgBUOocgnnXmFlib0oIubPg3eK8AuS+hxekwJDpSbnwYTppoVC3WzuzBDRaGCixbFsh7LKa9ZaD1ctG7wxTio5tPIXgLGnEI7RZA72E1Os1AVXzOozEFuAdI2ofVtHCi3olAlKkIk1FAMchdmqC7UrReHWFv0ypxIzptoRIrkQomJ2JCG0/koNKdQkl/BfHEW2gieJdRZKGfiDqG0FytYBaFJsbgLM1QX6okVR7lY9MqcSE5JAENtDAdELDIDLRTzdDmEvkmbuYK5COvFcCGyBnI26YmXVvT7oyIiDR3evSszAGROG3jmVMB/+MuoCBRXVNVMimoMUDIXIISunDk5+iOlM+DZ9hFMrg4zHfDkpFOW76wjE6EEwH/LXFPeWCrXECehEy0tQb6M5s/TEpM17WejR2BZPTm94UOFZgq76jSFzttUOLwaSPV9nDYj2aR0H/bB3SW1yQlo/qTUIQKW0KmenNmxKkMYV5lC1StYnvZ0gIEn6cY0uQrpNHRi2XKTqryM5H5OAEH6W9Z0yR3NzvL5tt26RypviVeoV695kZB3RE8rcyyUxqVbly6jDSapP6r+SXdtNo51rqh3MzXnRMASmkPh4VVjUGdQHzC3LhFRugDuwmuGybWZ6F4NUFG3JfqdOSaVUjtWFRuRnJSgybYxwD0pnN8L30SGPJtQ37SIFYvn3ic7Jl4KvZDpx1YfS6uz19iFpswEmuIMCY309d18nUF3cRws9Pz+F1r3v0QOPRidfmTVGOTLfY/qptAZSlfnGHiESUyuTeQtj3LzXSqKNlaQxACJidObhXP4WLKFNkDOc6pNaMOkCJUXZwmg9yhoGcncl+NYk3YIJW4yMZuscYbcfsOaHDVKK8qXNVk1BiVHwaJQQ51jwFMS2sHJbP1XJ0RtFvTmKBqLoQHmqWgImGiK3vr5GPk2oU15fh7/OKPmZQQ8LjIlWvZU0i70TFQECkKPGFCzAaiiyQGbUFn0rMbgJU2GXSgDP9FxYpDcDjEMFVvRLsmZ9NMnf8eJE9vHpHbPbbvTBJhiqEPvKngPFHpnNWBcp4ZNqJwPvFcI26s6Q6yoeosJ3kvnNFAUOk6tZJIjtNl46zZ14Ql3Al+JJuM2oWfjDKAawwjkuCU0S1sXDGyFQiBRexMimYq1WCevxMGmrmG1bZi+BcYwomoEgL5jr+dO3q3rP4zDn8/n6cMhTRueMIolCt+6MXy+UUyZ+9qsUcdg50j4xRxE5kOUTFz8rds5OvjHKORjOnFeHB+4dnrPoedxKhPAF5ll3IwyiynU+8B8uKdzQYac8uln0vgAcc1P7xkfWDEdIADKNgaJS0lbc9qEp/SeZweadJeqnRVCR9FBgBWvtfbGas0UeYUVXRQHJ/sMO8VvdMZ0Fw5ssYQSsGj7YFEMqmOCtVO97khdiTdYKO1A3rq0ogQ4OtTSeKuWpCXPueBglB9MNx9M6W+3Lmv9plVq/eEyAY4OtTQ8ei1ZS5yjBCoQymlJqwDXDMVrzly6RG8lKncAiUr4/w97eGe0JOpvyfpkZpxeOHEAAAAASUVORK5CYII=" alt="\textbf{\textrm{FC\_WHR}} = - (\textrm{E\_WHR\_mech} + \textrm{E\_WHR\_el\_mech}) \cdot k_\textrm{engline}" title="\textbf{\textrm{FC\_WHR}} = - (\textrm{E\_WHR\_mech} + \textrm{E\_WHR\_el\_mech}) \cdot k_\textrm{engline}" /></p>
+</div>
+<div id="hybrid-vehicles-reess-soc-correction" class="section level4">
+<h4>Hybrid Vehicles: REESS SoC Correction</h4>
+<p>If the REESS Soc at the end of the simulation is higher than the initial SoC the correction is done according to:</p>
+<p><br /><img style="vertical-align:middle" src="data:image/png;base64,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" alt="
+\textbf{\textrm{FC\_SoC}} = -\frac{\Delta\textrm{E\_REESS} \cdot k_\textrm{engline}}{\eta_{\textrm{EM}_\textrm{chg}} \cdot \eta_{\textrm{REESS}_\textrm{chg}}} 
+" title="
+\textbf{\textrm{FC\_SoC}} = -\frac{\Delta\textrm{E\_REESS} \cdot k_\textrm{engline}}{\eta_{\textrm{EM}_\textrm{chg}} \cdot \eta_{\textrm{REESS}_\textrm{chg}}} 
+" /><br /></p>
+<p>If the REESS Soc at the end of the simulation is lower than the initial SoC the correction is done according to:</p>
+<p><br /><img style="vertical-align:middle" src="data:image/png;base64,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" alt="
+\textbf{\textrm{FC\_SoC}} = - \Delta\textrm{E\_REESS} \cdot k_\textrm{engline} \cdot \eta_{\textrm{EM}_\textrm{dischg}} \cdot \eta_{\textrm{REESS}_\textrm{dischg}} 
+" title="
+\textbf{\textrm{FC\_SoC}} = - \Delta\textrm{E\_REESS} \cdot k_\textrm{engline} \cdot \eta_{\textrm{EM}_\textrm{dischg}} \cdot \eta_{\textrm{REESS}_\textrm{dischg}} 
+" /><br /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\eta_{\textrm{REESS}_\textrm{chg}} = \frac{\textrm{E\_REESS\_INT\_CHG}}{\textrm{E\_REEES\_T\_CHG}}" title="\eta_{\textrm{REESS}_\textrm{chg}} = \frac{\textrm{E\_REESS\_INT\_CHG}}{\textrm{E\_REEES\_T\_CHG}}" /></p>
+<p><img style="vertical-align:middle" src="data:image/png;base64,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" alt="\eta_{\textrm{REESS}_\textrm{dischg}} = \frac{\textrm{E\_REESS\_INT\_DISCHG}}{\textrm{E\_REEES\_T\_DISCHG}}" title="\eta_{\textrm{REESS}_\textrm{dischg}} = \frac{\textrm{E\_REESS\_INT\_DISCHG}}{\textrm{E\_REEES\_T\_DISCHG}}" /></p>
+</div>
 </div>
 <div id="engine-line-approach" class="section level3">
 <h3>Engine-Line Approach</h3>
@@ -5488,7 +5588,7 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>[kW]</td>
 <td>Auxiliary Supply Power. Can be defined multiple times with different Identifiers. The supply power input for each auxiliary defined in the <a href="#job-file">.vecto file</a> with the corresponding ID. ID’s are not case sensitive and must only contain letters and numbers [a-z,A-Z,0-9]. Must be &gt;= 0 kW.</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td><em>P_PTO</em></td>
 <td>[kW]</td>
 <td>Auxiliary power applied for PTO activation mode 2 (PTO active during drive, PTO demand defined in cycle)</td>
@@ -5947,7 +6047,7 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <h2>Modal Results (.vmod)</h2>
 <p>Modal results are only created if enabled in the <a href="#main-form">Options</a> tab. One file is created for each calculation and stored in the same directory as the .vecto file.</p>
 <p>In Vecto 3 the structure of the modal data output has been revised and re-structured. Basically for every powertrain component the .vmod file contains the power at the input shaft and the individual power losses for every component. For the engine the power, torque and engine speed at the output shaft is given along with the internal power and torque used for computing the fuel consumption. See <a href="#powertrain-and-components-structure">Powertrain and Components Structure</a> for schematics how the powertrain looks like and which positions in the powertrain the values represent.</p>
-<p>Every line in the .vmod file represents the simulation interval from time - dt/2 to time + dt/2. All values represent the average power/torque/angular velocity during this simulation interval. If a certain power value can be described as function of the vehicle’s acceleration the average power is calculated by <img style="vertical-align:middle" src="data:image/png;base64,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" alt="P_{avg} = \frac{1}{simulation interval} \int{P(t) dt}" title="P_{avg} = \frac{1}{simulation interval} \int{P(t) dt}" />. <strong>Note:</strong> Columns for the torque converter operating point represent the torque/angular speed at the end of the simulation interval!</p>
+<p>Every line in the .vmod file represents the simulation interval from time - dt/2 to time + dt/2. All values represent the average power/torque/angular velocity during this simulation interval. If a certain power value can be described as function of the vehicle’s acceleration the average power is calculated by <img style="vertical-align:middle" src="data:image/png;base64,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" alt="P_{avg} = \frac{1}{simulation interval} \int{P(t) dt}" title="P_{avg} = \frac{1}{simulation interval} \int{P(t) dt}" />.</p>
 <p><strong>Note:</strong> Columns for the torque converter operating point represent the torque/angular speed at the end of the simulation interval!</p>
 <div id="quantities" class="section level3">
 <h3>Quantities:</h3>
@@ -6043,20 +6143,170 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>Engine’s transient maximum power (see <a href="#engine-transient-full-load">transient full load</a>)</td>
 </tr>
 <tr class="even">
+<td>P_ice_full_stat</td>
+<td>[kW]</td>
+<td>Engine’s stationary maximum power</td>
+</tr>
+<tr class="odd">
 <td>P_ice_drag</td>
 <td>[kW]</td>
 <td>Engine’s drag power</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_ice_inertia</td>
 <td>[kW]</td>
 <td>Power loss/gain due to the engine’s inertia</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_ice_out</td>
 <td>[kW]</td>
 <td>Power provided at the engine’s output shaft</td>
 </tr>
+<tr class="even">
+<td>P_REESS_T</td>
+<td>[kW]</td>
+<td>Electric power provided at the battery’s connector</td>
+</tr>
+<tr class="odd">
+<td>P_REESS_int</td>
+<td>[kW]</td>
+<td>Internal battery power</td>
+</tr>
+<tr class="even">
+<td>P_REESS_loss</td>
+<td>[kW]</td>
+<td>Losses of the battery due to its internal resistance.</td>
+</tr>
+<tr class="odd">
+<td>P_REESS_charge_max</td>
+<td>[kW]</td>
+<td>Maximum power the battery can be charged with</td>
+</tr>
+<tr class="even">
+<td>P_REESS_discharge_max</td>
+<td>[kW]</td>
+<td>Maximum power the battery can provide</td>
+</tr>
+<tr class="odd">
+<td>REESS SOC</td>
+<td>[%]</td>
+<td>The battery’s current state of charge</td>
+</tr>
+<tr class="even">
+<td>U_REESS_T</td>
+<td>[V]</td>
+<td>Voltage at the battery’s connector</td>
+</tr>
+<tr class="odd">
+<td>U_0_REESS</td>
+<td>[V]</td>
+<td>Battery’s internal voltage</td>
+</tr>
+<tr class="even">
+<td>I_REESS</td>
+<td>[A]</td>
+<td>Current charging/discharging the battery.</td>
+</tr>
+<tr class="odd">
+<td>i_&lt;POS}-em</td>
+<td>[-]</td>
+<td>Ratio between drivetrain and electric motor shaft</td>
+</tr>
+<tr class="even">
+<td>P_&lt;POS&gt;_out</td>
+<td>[kW]</td>
+<td>Power at the electric machine’s output shaft (drivetrain)</td>
+</tr>
+<tr class="odd">
+<td>P_&lt;POS&gt;_mech</td>
+<td>[kW]</td>
+<td>Mechanical power the electric machine applies to the drivetrain. Positive values mean that electric energy is generated while negative values mean that the electric machine drives the vehicle.</td>
+</tr>
+<tr class="even">
+<td>P_&lt;POS&gt;_in</td>
+<td>[kW]</td>
+<td>Power at the electric machine’s input shaft (drivetrain)</td>
+</tr>
+<tr class="odd">
+<td>P_&lt;POS&gt;_transm_loss</td>
+<td>[kW]</td>
+<td>Losses of the transmission stage inside the electric motor component</td>
+</tr>
+<tr class="even">
+<td>P_&lt;POS&gt;-em_mech</td>
+<td>[kW]</td>
+<td>Power at the shaft of the electric motor at position <em>POS</em></td>
+</tr>
+<tr class="odd">
+<td>P_&lt;POS&gt;-em_inertia_loss</td>
+<td>[kW]</td>
+<td>Inertia loses of the electric machine</td>
+</tr>
+<tr class="even">
+<td>P_&lt;POS&gt;-em_mech_map</td>
+<td>[kW]</td>
+<td>Mechanical powerthe electric motor at position <em>POS</em> applies for driving or recuperation, including the electric motor’s inertia</td>
+</tr>
+<tr class="odd">
+<td>P_&lt;POS&gt;-em_loss</td>
+<td>[kW]</td>
+<td>Losses in the electric machine due to converting electric power to mechanical power</td>
+</tr>
+<tr class="even">
+<td>P_&lt;POS&gt;-em_el</td>
+<td>[kW]</td>
+<td>Electric power generated or consumed by the elctric machine</td>
+</tr>
+<tr class="odd">
+<td>P_&lt;POS&gt;_loss</td>
+<td>[kW]</td>
+<td>The total sum of losses of the electric motor at position <em>POS</em>. Calcualted as the difference of mecanical power applied at the drivetrain and the electrical power drawn from the REESS.</td>
+</tr>
+<tr class="even">
+<td>n_&lt;POS&gt;-em_avg</td>
+<td>[rpm]</td>
+<td>Angular speed of the electric motor at position <em>POS</em></td>
+</tr>
+<tr class="odd">
+<td>T_&lt;POS&gt;-em</td>
+<td>[Nm]</td>
+<td>Torque at the shaft of electric motor at position <em>POS</em>. Positive values mean that the electric motor acts as generator, negative torque values mean that the electric motor propels the vehicle</td>
+</tr>
+<tr class="even">
+<td>T_&lt;POS&gt;-em_map</td>
+<td>[Nm]</td>
+<td>Torque internal torque of the electric motor at posision <em>POS</em>. Takes into account the electric motor’s intertia. Positive values mean that the electric motor acts as generator, negative torque values mean that the electric motor propels the vehicle</td>
+</tr>
+<tr class="odd">
+<td>T_&lt;POS&gt;-em_drive_max</td>
+<td>[Nm]</td>
+<td>Maximum torque the electric machine can apply to propel the vehicle. This already considers the maximum current the battery can provide</td>
+</tr>
+<tr class="even">
+<td>T_&lt;POS&gt;-em_gen_max</td>
+<td>[Nm]</td>
+<td>Maximum torque the electric machine can apply to generate electric power. This already considers the maximum charge current the battery can handle.</td>
+</tr>
+<tr class="odd">
+<td>P_&lt;POS&gt;-em_drive_max</td>
+<td>[kW]</td>
+<td>Maximum power the electric motor can provide to drive the vehicle. This already considers the maximum electric power the battery can provide.</td>
+</tr>
+<tr class="even">
+<td>P_&lt;POS&gt;-em_gen_max</td>
+<td>[kW]</td>
+<td>Maximum power the electric machine can generate. This already considers the maximum charge power the battery can handle.</td>
+</tr>
+<tr class="odd">
+<td>EM_OVL-&lt;POS&gt;-em</td>
+<td>[%]</td>
+<td>Used capacity of the thermal overload buffer of the thermal derating model</td>
+</tr>
+<tr class="even">
+<td>EM_&lt;POS&gt;_off</td>
+<td>[-]</td>
+<td>Indicates if the electric motor at position <em>POS</em> is energized or not.</td>
+</tr>
 <tr class="odd">
 <td>P_clutch_loss</td>
 <td>[kW]</td>
@@ -6078,121 +6328,132 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>Power loss in the torque converter</td>
 </tr>
 <tr class="odd">
-<td>P_aux</td>
+<td>P_aux_mech</td>
 <td>[kW]</td>
-<td>Total power demand from the auxiliaries</td>
+<td>Total power demand from the mechanical auxiliaries</td>
 </tr>
 <tr class="even">
+<td>P_aux_el</td>
+<td>[kW]</td>
+<td>Total power demand from the electric auxiliaries connected to the REESS</td>
+</tr>
+<tr class="odd">
 <td>P_gbx_in</td>
 <td>[kW]</td>
 <td>Power at the gearbox’ input shaft</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_gbx_loss</td>
 <td>[kW]</td>
 <td>Power loss at the gearbox, interpolated from the loss-map + shift losses + inertia losses</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_gbx_shift</td>
 <td>[kW]</td>
 <td>Power loss due to gearshifts (AT gearbox)</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_gbx_inertia</td>
 <td>[kW]</td>
 <td>Power loss due to the gearbox’ inertia</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_ret_in</td>
 <td>[kW]</td>
 <td>Power at the retarder’s input shaft. P_ret_in = P_gbx_in - P_gbx_loss - P_gbx_inertia</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_ret_loss</td>
 <td>[kW]</td>
 <td>Power loss at the retarder, interpolated from the loss-map.</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_angle_in</td>
 <td>[kW]</td>
 <td>Power at the anglegear’s input shaft. Empty if no Anglegear is used.</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_angle_loss</td>
 <td>[kW]</td>
 <td>Power loss at the anglegear, interpolated from the loss-map. Empty if no Anglegear is used.</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_axle_in</td>
 <td>[kW]</td>
 <td>Power at the axle-gear input shaft. P_axle_in = P_ret_in - P_ret_loss ( - P_angle_loss if an Angulargear is used).</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_axle_loss</td>
 <td>[kW]</td>
 <td>Power loss at the axle gear, interpolated from the loss-map.</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_brake_in</td>
 <td>[kW]</td>
 <td>Power at the brake input shaft (definition: serially mounted into the drive train between wheels and axle). P_brake_in = P_axle_in - P_axle_loss</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_brake_loss</td>
 <td>[kW]</td>
 <td>Power loss due to braking.</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_wheel_in</td>
 <td>[kW]</td>
 <td>Power at the driven wheels. P_wheel_in = P_brake_in - P_brake_loss</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_wheel_inertia</td>
 <td>[kW]</td>
 <td>Power loss due to the wheels’ inertia</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_trac</td>
 <td>[kW]</td>
 <td>Vehicle’s traction power. P_trac = P_wheel_in - P_wheel_inertia</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_slope</td>
 <td>[kW]</td>
 <td>Power loss/gain due to the road’s slope</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_air</td>
 <td>[kW]</td>
 <td>Power loss due to air drag.</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_roll</td>
 <td>[kW]</td>
 <td>Rolling resistance power loss.</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_veh_inertia</td>
 <td>[kW]</td>
 <td>Power loss due to the vehicle’s inertia</td>
 </tr>
+<tr class="even">
+<td>n_gbx_out_avg</td>
+<td>[rpm]</td>
+<td>Average angular speed at gearbox out shaft</td>
+</tr>
 <tr class="odd">
-<td>P_busAux_ES_HVAC</td>
-<td>[kW]</td>
-<td>(Average) electric power demand for the HVAC system (mainly ventilation power) <em>(only in .vmod file if bus auxiliaries are used)</em></td>
+<td>T_gbx_out</td>
+<td>[Nm]</td>
+<td>Torque at gearbox out shaft</td>
 </tr>
 <tr class="even">
-<td>P_PTO_RoadSweeping</td>
-<td>[kW]</td>
-<td>Power demand from the PTO in PTO mode 2. Only in engineering mode if PTO mode 2 is activated.</td>
+<td>T_gbx_in</td>
+<td>[Nm]</td>
+<td>Torque at gearbox in shaft</td>
 </tr>
 <tr class="odd">
-<td>P_PTO_DuringDrive</td>
+<td>P_busAux_ES_HVAC</td>
 <td>[kW]</td>
-<td>Power demand from the PTO cycle in PTO mode 3. Only in engineering mode if PTO mode 3 is activated.</td>
+<td>(Average) electric power demand for the HVAC system (mainly ventilation power) <em>(only in .vmod file if bus auxiliaries are used)</em></td>
 </tr>
 <tr class="even">
+<td>P_busAux_ES_other</td>
 <td>[kW]</td>
 <td>(Average) electric power demand for all other electric consumers (lights, radio, kitchen, …) <em>(only in .vmod file if bus auxiliaries are used)</em></td>
 </tr>
@@ -6257,10 +6518,30 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>Mechanical power demand for the air compressor if no air is produced (compressor is in drag only, used for correcting the total fuel consumption in case of smart pneumatic system) <em>(only in .vmod file if bus auxiliaries are used)</em></td>
 </tr>
 <tr class="odd">
+<td>P_DC/DC_In</td>
+<td>[kW]</td>
+<td>Electrical power at the input (REESS side) of the DC/DC converter. <em>(only applicable in case the electric auxiliaries are connected to the high-voltage REESS, output is delayed by one simulation step)</em></td>
+</tr>
+<tr class="even">
+<td>P_DC/DC_Out</td>
+<td>[kW]</td>
+<td>Electrical power at the output (REESS side) of the DC/DC converter. <em>(only applicable in case the electric auxiliaries are connected to the high-voltage REESS, output is delayed by one simulation step)</em></td>
+</tr>
+<tr class="odd">
+<td>P_DC/DC_missing</td>
+<td>[kW]</td>
+<td>Electrical power the DC/DC converter could not provide to the low-voltage auxiliaries becuase the REESS was already at its minimum SoC. This column is used in post-processing.</td>
+</tr>
+<tr class="even">
 <td>P_aux_<XXX></td>
 <td>[kW]</td>
 <td>Mechanical power demand for every individual auxiliary. Only if the run has auxiliaries. In case of fully electrical auxiliaries for trucks the electrical power demand is converted to mechanical power using the alternator efficiency. For Buses with fully electrical auxiliaries the consumer is connected to the electrical system and thus the according column reports 0 power demand.</td>
 </tr>
+<tr class="odd">
+<td>T_max_propulsion</td>
+<td>[Nm]</td>
+<td>Maximum allowed propulsion torque at gearbox input shaft</td>
+</tr>
 <tr class="even">
 <td>P_WHR_el</td>
 <td>[kW]</td>
@@ -6272,255 +6553,120 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>Power generated by an electric WHR system after applying</td>
 </tr>
 <tr class="even">
-<td>P_aux_ESS_mech</td>
+<td>P_WHR_mech</td>
+<td>[kW]</td>
+<td>Power generated by an mechanical WHR system, interpolated from WHR map.</td>
+</tr>
+<tr class="odd">
+<td>P_WHR_mech_corr</td>
+<td>[kW]</td>
+<td>Power generated by an mechanical WHR system after applying</td>
+</tr>
+<tr class="even">
+<td>P_aux_ESS_mech_ICE_off</td>
 <td>[kW]</td>
-<td>Power demand of the auxiliaries considered during engine off periods, multiplied by the engine start/stop utility factor. The final fuel consumption (.vsum) is correctedd for this power demand in a <a href="#engine-fuel-consumption-correction">post-processing step</a>. This power demand has no influence on FC-Map.</td>
+<td>Power demand of the auxiliaries ‘missing’ if the ICE is off.T he final fuel consumption (.vsum) is correctedd for this power demand in a <a href="#engine-fuel-consumption-correction">post-processing step</a>. This power demand has no influence on FC-Map.</td>
 </tr>
 <tr class="odd">
+<td>P_aux_ESS_mech_ICE_on</td>
+<td>[kW]</td>
+<td>Power demand of the auxiliaries ‘missing’ in case the ICE would be on during actual ICE off periods. The final fuel consumption (.vsum) is correctedd for this power demand in a <a href="#engine-fuel-consumption-correction">post-processing step</a>. This power demand has no influence on FC-Map.</td>
+</tr>
+<tr class="even">
 <td>P_ice_start</td>
 <td>[kW]</td>
 <td>Power demand for starting the engine after an engine-off period multiplied by the engine start/stop utility factor. P_ice_start = <a href="#advanced-driver-assistant-systems-eco-roll-engine-stopstart">E_ice_start</a> / dt. The final fuel consumption (.vmod) is corrected for this power demand in a <a href="#engine-fuel-consumption-correction">post-processing step</a>. This power demand has no influence on FC-Map.</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>P_PTO_consum</td>
 <td>[kW]</td>
 <td>Power demand from the PTO consumer. Only if the vehicle has a PTO consumer.</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>P_PTO_transmission</td>
 <td>[kW]</td>
 <td>Power demand from the PTO transmission. Only if the vehicle has a PTO consumer.</td>
 </tr>
+<tr class="odd">
+<td>P_PTO_RoadSweeping</td>
+<td>[kW]</td>
+<td>Power demand from the PTO in PTO mode 2. Only in engineering mode if PTO mode 2 is activated.</td>
+</tr>
 <tr class="even">
+<td>P_PTO_DuringDrive</td>
+<td>[kW]</td>
+<td>Power demand from the PTO cycle in PTO mode 3. Only in engineering mode if PTO mode 3 is activated.</td>
+</tr>
+<tr class="odd">
 <td>TCnu</td>
 <td>[-]</td>
 <td>Torque converter operating point: speed ratio</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>TCmu</td>
 <td>[-]</td>
 <td>Torque converter operating point: torque ratio</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>T_TC_out</td>
 <td>[Nm]</td>
 <td>Torque converter operating point: output torque</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>n_TC_out</td>
 <td>[rpm]</td>
 <td>Torque converter operating point: output speed</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>T_TC_in</td>
 <td>[Nm]</td>
 <td>Torque converter operating point: input torque</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>n_TC_in</td>
 <td>[rpm]</td>
 <td>Torque converter operating point: input speed</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>FC-Map&lt;_FuelName&gt;</td>
 <td>[g/h]</td>
 <td>Fuel consumption interpolated from FC map.</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>FC-NCVc&lt;_FuelName&gt;</td>
 <td>[g/h]</td>
 <td>Fuel consumption corrected for different NCV values in VECTO and VECTO Engine (FC-NCVc = FC-Map * LowerHeatingValueVectoEngine(fuel) / LowerHeatingValueVecto(fuel) )</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>FC-WHTCc&lt;_FuelName&gt;</td>
 <td>[g/h]</td>
 <td>Fuel consumption after <a href="#engine-fuel-consumption-calculation">WHTC Correction</a> (FC-WHTCc = FC-NCVc * WHTCCorrectionFactor(cycle, fuel) )</td>
 </tr>
-<tr class="odd">
-<td>FC-AAUX&lt;_FuelName&gt;</td>
-<td>[g/h]</td>
-<td>Fuel consumption computed by the AAUX module considering smart auxiliaries. (FC-AAUX = FC-WHTCc if the AAUX model is not used, otherwise the fuel consumption as calculated by the AAUX model)</td>
-</tr>
 <tr class="even">
-<td>FC-ESS&lt;_FuelName&gt;</td>
-<td>[g/h]</td>
-<td>Fuel consumption considering engine stop/start not always activated. (FC-ESS = FC-AAUX if the engie is on, FC-ESS = FC(P_aux) * (1 - engine stop/start utility factor) if the combustion engine is off - see <a href="#advanced-driver-assistant-systems-eco-roll-engine-stopstart">Engine Stop/Start</a></td>
-</tr>
-<tr class="odd">
 <td>FC-Final_mod&lt;_FuelName&gt;</td>
 <td>[g/h]</td>
 <td>Instantaneous final fuel consumption value after all applicable corrections. (FC-Final_mod = FC-ESS)</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>EcoRollConditionsMet</td>
 <td></td>
 <td>0 if the conditions for switching to eco-roll are <em>not</em> met, 1 if the conditions for eco-roll are met - eco roll is activated after the activation delay (2s in declaration mode)</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>PCCSegment</td>
 <td></td>
 <td>1 if a PCC segment was identified in the pre-processing (gradient below threshold where vehicle accelerates on its own without engine power) , 0 otherwise</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>PCCState</td>
 <td></td>
 <td>0: not inside PCC segment, 1: inside PCC segment, 2: PCC use-case 1 active, 3: PCC use-case 2 active</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>ICE On</td>
 <td></td>
 <td>0 if the combustion engine is switched off (either during stand-still or eco-roll), 1 otherwise</td>
 </tr>
-<tr class="even">
-<td>i_&lt;POS}-em</td>
-<td>[-]</td>
-<td>Ratio between drivetrain and electric motor shaft</td>
-</tr>
-<tr class="odd">
-<td>n_&lt;POS&gt;-em_avg</td>
-<td>[rpm]</td>
-<td>Angular speed of the electric motor at position <em>POS</em></td>
-</tr>
-<tr class="even">
-<td>T_&lt;POS&gt;-em</td>
-<td>[Nm]</td>
-<td>Torque at the shaft of electric motor at position <em>POS</em>. Positive values mean that the electric motor acts as generator, negative torque values mean that the electric motor propels the vehicle</td>
-</tr>
-<tr class="odd">
-<td>T_&lt;POS&gt;-em_map</td>
-<td>[Nm]</td>
-<td>Torque internal torque of the electric motor at posision <em>POS</em>. Takes into account the electric motor’s intertia. Positive values mean that the electric motor acts as generator, negative torque values mean that the electric motor propels the vehicle</td>
-</tr>
-<tr class="even">
-<td>T_&lt;POS&gt;-em_drive_max</td>
-<td>[Nm]</td>
-<td>Maximum torque the electric machine can apply to propel the vehicle. This already considers the maximum current the battery can provide</td>
-</tr>
-<tr class="odd">
-<td>T_&lt;POS&gt;-em_gen_max</td>
-<td>[Nm]</td>
-<td>Maximum torque the electric machine can apply to generate electric power. This already considers the maximum charge current the battery can handle.</td>
-</tr>
-<tr class="even">
-<td>P_&lt;POS&gt;-em_drive_max</td>
-<td>[kW]</td>
-<td>Maximum power the electric motor can provide to drive the vehicle. This already considers the maximum electric power the battery can provide.</td>
-</tr>
-<tr class="odd">
-<td>P_&lt;POS&gt;-em_gen_max</td>
-<td>[kW]</td>
-<td>Maximum power the electric machine can generate. This already considers the maximum charge power the battery can handle.</td>
-</tr>
-<tr class="even">
-<td>P_&lt;POS&gt;-em_mech</td>
-<td>[kW]</td>
-<td>Power at the shaft of the electric motor at position <em>POS</em></td>
-</tr>
-<tr class="odd">
-<td>P_&lt;POS&gt;-em_mech_map</td>
-<td>[kW]</td>
-<td>Mechanical powerthe electric motor at position <em>POS</em> applies for driving or recuperation, including the electric motor’s inertia</td>
-</tr>
-<tr class="even">
-<td>P_&lt;POS&gt;-em_el</td>
-<td>[kW]</td>
-<td>Electric power generated or consumed by the elctric machine</td>
-</tr>
-<tr class="odd">
-<td>P_&lt;POS&gt;-em_loss</td>
-<td>[kW]</td>
-<td>Losses in the electric machine due to converting electric power to mechanical power</td>
-</tr>
-<tr class="even">
-<td>P_&lt;POS&gt;-em_inertia_loss</td>
-<td>[kW]</td>
-<td>Inertia loses of the electric machine</td>
-</tr>
-<tr class="odd">
-<td>P_&lt;POS&gt;_in</td>
-<td>[kW]</td>
-<td>Power at the electric machine’s input shaft (drivetrain)</td>
-</tr>
-<tr class="even">
-<td>P_&lt;POS&gt;_out</td>
-<td>[kW]</td>
-<td>Power at the electric machine’s output shaft (drivetrain)</td>
-</tr>
-<tr class="odd">
-<td>P_&lt;POS&gt;_mech</td>
-<td>[kW]</td>
-<td>Mechanical power the electric machine applies to the drivetrain. Positive values mean that electric energy is generated while negative values mean that the electric machine drives the vehicle.</td>
-</tr>
-<tr class="even">
-<td>P_&lt;POS&gt;_loss</td>
-<td>[kW]</td>
-<td>The total sum of losses of the electric motor at position <em>POS</em>. Calcualted as the difference of mecanical power applied at the drivetrain and the electrical power drawn from the REESS.</td>
-</tr>
-<tr class="odd">
-<td>P_&lt;POS&gt;_transm_loss</td>
-<td>[kW]</td>
-<td>Losses of the transmission stage inside the electric motor component</td>
-</tr>
-<tr class="even">
-<td>EM_OVL-&lt;POS&gt;-em</td>
-<td>[%]</td>
-<td>Used capacity of the thermal overload buffer of the thermal derating model</td>
-</tr>
-<tr class="odd">
-<td>EM_&lt;POS&gt;_off</td>
-<td>[-]</td>
-<td>Indicates if the electric motor at position <em>POS</em> is energized or not.</td>
-</tr>
-<tr class="even">
-<td>P_bat_T</td>
-<td>[kW]</td>
-<td>Electric power provided at the battery’s connector</td>
-</tr>
-<tr class="odd">
-<td>P_bat_int</td>
-<td>[kW]</td>
-<td>Internal battery power</td>
-</tr>
-<tr class="even">
-<td>P_bat_loss</td>
-<td>[kW]</td>
-<td>Losses of the battery due to its internal resistance.</td>
-</tr>
-<tr class="odd">
-<td>Battery SOC</td>
-<td>[%]</td>
-<td>The battery’s current state of charge</td>
-</tr>
-<tr class="even">
-<td>E_bat</td>
-<td>[kWh]</td>
-<td>The amount of energy currently stored in the battery</td>
-</tr>
-<tr class="odd">
-<td>P_bat charge max</td>
-<td>[kW]</td>
-<td>Maximum power the battery can be charged with</td>
-</tr>
-<tr class="even">
-<td>P_bat discharge max</td>
-<td>[kW]</td>
-<td>Maximum power the battery can provide</td>
-</tr>
-<tr class="odd">
-<td>U_bat_T</td>
-<td>[V]</td>
-<td>Voltage at the battery’s connector</td>
-</tr>
-<tr class="even">
-<td>U_0_bat</td>
-<td>[V]</td>
-<td>Battery’s internal voltage</td>
-</tr>
-<tr class="odd">
-<td>I_bat</td>
-<td>[A]</td>
-<td>Current charging/discharging the battery.</td>
-</tr>
 </tbody>
 </table>
 <p><strong>Note:</strong> The fuel name is only added to the fuel-consumption signals in case of dual-fuel engines.</p>
@@ -6623,17 +6769,17 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <tr class="odd">
 <td>FC-ESS&lt;_FuelName&gt;</td>
 <td>[g/h], [g/km]</td>
-<td>Average fuel consumption including fuel consumption during engine-off periods (Based on FC-ESS from .vmod)</td>
+<td>Average fuel consumption considering the ICE is not always off during ICE-off periods in the simulation. Considers all auxiliary demands during Off-phases taking into account the ESS utility factors</td>
 </tr>
 <tr class="even">
 <td>FC-ESS_Corr&lt;_FuelName&gt;</td>
 <td>[g/h], [g/km]</td>
-<td>Average fuel consumption including fuel consumption during engine-off periods corrected for energy demand during engine-off periods not accounted (FC-ESS_Corr = FC-WHR_Corr + (E_aux_ess_mech + E_ice_start) * k_vehline)</td>
+<td>Average fuel consumption including fuel consumption during engine-off periods corrected for energy demand during engine-off periods not accounted (FC-ESS_Corr = FC_WHTCc + FC_ESS)</td>
 </tr>
 <tr class="odd">
 <td>FC-BusAux_PS_Corr&lt;_FuelName&gt;</td>
 <td>[g/h], [g/km]</td>
-<td>Average fuel consumption corrected for the excessive/missing energy for the smart pneumatic system</td>
+<td>Average fuel consumption corrected for the excessive/missing energy for the smart pneumatic system, also corrected for the air demand according to the correct driving time.</td>
 </tr>
 <tr class="even">
 <td>FC-BusAux_ES_Corr&lt;_FuelName&gt;</td>
@@ -6646,6 +6792,16 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>Average fuel consumption including fuel consumption deduction due to electric power generated by an electric WHR system (FC-WHR_Corr = FC-ESS - E_WHR_el / eta_alternator * k_vehline)</td>
 </tr>
 <tr class="even">
+<td>FC-SoC&lt;_FuelName&gt;</td>
+<td>[g/h], [g/km]</td>
+<td>Average fuel consumption to correct the REESS SoC so that the SoC at the end of the cycle mathces the SoC at the beginning</td>
+</tr>
+<tr class="odd">
+<td>FC-SoC_Corr&lt;_FuelName&gt;</td>
+<td>[g/h], [g/km]</td>
+<td>Average fuel consumption including the correction for the REESS SoC</td>
+</tr>
+<tr class="even">
 <td>FC-BusAux_AuxHeater&lt;_FuelName&gt;</td>
 <td>[g/h], [g/km]</td>
 <td>Average fuel consumption of the additionalheater. In case of dual-fuel vehicles the aux heater is fueled with the primary fuel</td>
@@ -6661,11 +6817,61 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>Final average fuel consumption after ALL corrections (FC-Final = FC-ESS_Corr). Fuel consumption for calculation of CO<sub>2</sub> value. If Loading = 0[kg] the column [l/100tkm] is left empty.</td>
 </tr>
 <tr class="odd">
+<td>k_vehline</td>
+<td>[g/kWh]</td>
+<td>Slope of the regression line derived from all operating points P_wheel vs. FC_final_mod where P_wheel &gt; 0 and FC_final_mod &gt; 0</td>
+</tr>
+<tr class="even">
+<td>k_engline</td>
+<td>[g/kWh]</td>
+<td>Slope of the regression line used for the <a href="#engine-fuel-consumption-correction">fuel consumption correction</a></td>
+</tr>
+<tr class="odd">
 <td>CO2</td>
 <td>[g/km], [g/tkm], [g/m^3km]</td>
 <td>Average CO<sub>2</sub> emissions (based on FC-Final value). Output for [l/100tkm] is empty when Loading = 0[kg].</td>
 </tr>
 <tr class="even">
+<td>REESS Start SoC</td>
+<td>[%]</td>
+<td>State of charge of the REESS at the beginning of the simulation run</td>
+</tr>
+<tr class="odd">
+<td>REESS End SoC</td>
+<td>[%]</td>
+<td>State of charge pf the REESS at the end of the simulation run</td>
+</tr>
+<tr class="even">
+<td>ΔE_REESS</td>
+<td>[kWh]</td>
+<td>Delta energy stored in the REESS between start and end of the simulation run. Calculated from P_REESS_int.</td>
+</tr>
+<tr class="odd">
+<td>E_REESS_loss</td>
+<td>[kWh]</td>
+<td>Total losses in the REESS due to its internal resistance</td>
+</tr>
+<tr class="even">
+<td>E_REESS_T_chg</td>
+<td>[kWh]</td>
+<td>Total energy charged into the REESS at the terminal (includes losses at internal resistance)</td>
+</tr>
+<tr class="odd">
+<td>E_REESS_T_dischg</td>
+<td>[kWh]</td>
+<td>Total energy discharged from the REESS at the terminal (includes losses at the internal resistance)</td>
+</tr>
+<tr class="even">
+<td>E_REESS_int_chg</td>
+<td>[kWh]</td>
+<td>Total energy charged into the REES (excluding losses)</td>
+</tr>
+<tr class="odd">
+<td>E_REESS_int_dischg</td>
+<td>[kWh]</td>
+<td>Total energy discharged from the REESS (excluding losses)</td>
+</tr>
+<tr class="even">
 <td>P_wheel_in_pos</td>
 <td>[kW]</td>
 <td>Average positive power at the wheels</td>
@@ -6711,149 +6917,209 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>Total energy demand of all auxiliaries. This is the sum for all E_aux_xxx columns and the bus auxiliaires.</td>
 </tr>
 <tr class="odd">
+<td>E_aux_el(HV)</td>
+<td>[kWh]</td>
+<td>Total energy demand of the electric auxiliaries connected directly to the REESS.</td>
+</tr>
+<tr class="even">
 <td>E_clutch_loss</td>
 <td>[kWh]</td>
 <td>Total energy loss in the clutch</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_tc_loss</td>
 <td>[kWh]</td>
 <td>Total torque converter energy loss</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>E_gbx_loss</td>
 <td>[kWh]</td>
 <td>Total transmission energy losses at gearbox (includes loss-map, inertia, and gear-shifts). E_shift_loss is already included here.</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_shift_loss</td>
 <td>[kWh]</td>
 <td>Total energy losses due to gearshifts</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>E_ret_loss</td>
 <td>[kWh]</td>
 <td>Total retarder energy loss</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_angle_loss</td>
 <td>[kWh]</td>
 <td>Total torque converter energy loss</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>E_axl_loss</td>
 <td>[kWh]</td>
 <td>Total transmission energy losses at the axlegear</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_brake</td>
 <td>[kWh]</td>
 <td>Total work dissipated in mechanical braking (sum of service brakes, retader and additional engine exhaust brakes)</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>E_vehicle_inertia</td>
 <td>[kWh]</td>
 <td>Total work of wheels inertia and vehicle mass</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_air</td>
 <td>[kWh]</td>
 <td>Total work of air resistance</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>E_roll</td>
 <td>[kWh]</td>
 <td>Total work of rolling resistance</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_grad</td>
 <td>[kWh]</td>
 <td>Total work of gradient resistance</td>
 </tr>
+<tr class="even">
+<td>n_EM_&lt;POS&gt;-em_avg</td>
+<td>[rpm]</td>
+<td>Average angular speed of the electric machine</td>
+</tr>
+<tr class="odd">
+<td>E_EM_&lt;POS&gt;-em_drive</td>
+<td>[kWh]</td>
+<td>Mechanical energy at the electric motor shaft applied by the electric machine at position <em>POS</em> to drive the vehicle</td>
+</tr>
+<tr class="even">
+<td>E_EM_&lt;POS&gt;-em_gen</td>
+<td>[kWh]</td>
+<td>Mechanical energy at the electric motor shaft recuperated by the electric machine at position <em>POS</em></td>
+</tr>
+<tr class="odd">
+<td>η_EM_&lt;POS&gt;-em_drive</td>
+<td>[-]</td>
+<td>Average efficiency of the electric machine when the electric machine drives the vehicle. Based on the mechanical energy at the electric motor shaft and the electric energy.</td>
+</tr>
+<tr class="even">
+<td>η_EM_&lt;POS&gt;-em_gen</td>
+<td>[-]</td>
+<td>Average efficiency of the electric machine when the electric machine generates electric energy. Based on the mechanical energy at the electric motor shaft and the electric energy.</td>
+</tr>
+<tr class="odd">
+<td>E_EM_&lt;POS&gt;_drive</td>
+<td>[kWh]</td>
+<td>Mechanical energy applied at the drivetrain by the electric machine at position <em>POS</em> to drive the vehicle</td>
+</tr>
+<tr class="even">
+<td>E_EM_&lt;POS&gt;_gen</td>
+<td>[kWh]</td>
+<td>Mechanical energy at the drivetrain recuperated by the electric machine at position <em>POS</em></td>
+</tr>
 <tr class="odd">
+<td>η_EM_&lt;POS&gt;_drive</td>
+<td>[-]</td>
+<td>Average efficiency at the drivetrain of the electric machine when the electric machine drives the vehicle. Based on the mechanical energy at the drivetrain and the electric power.</td>
+</tr>
+<tr class="even">
+<td>η_EM_&lt;POS&gt;_gen</td>
+<td>[-]</td>
+<td>Average efficiency at the drivetrain of the electric machine when the electric machine generates electric energy. Based on the mechanical energy at the drivetrain and the electric power</td>
+</tr>
+<tr class="odd">
+<td>E_EM_&lt;POS&gt;_off_loss</td>
+<td>[kWh]</td>
+<td>Total losses added by the electric machine when the electric machine is not energized (i.e., the electric machine’s drag losses)</td>
+</tr>
+<tr class="even">
+<td>E_EM_&lt;POS&gt;_transm_loss</td>
+<td>[kWh]</td>
+<td>Losses of the transmission stage in the electric motor component.</td>
+</tr>
+<tr class="odd">
+<td>E_EM_&lt;POS&gt;-em_loss</td>
+<td>[kWh]</td>
+<td>Total losses of the electric motor component. Calculated from P_<POS>-em_loss</td>
+</tr>
+<tr class="even">
+<td>E_EM_&lt;POS&gt;_loss</td>
+<td>[kWh]</td>
+<td>Losses of the electric machine. Calculated from P_<POS>_loss</td>
+</tr>
+<tr class="odd">
+<td>EM &lt;POS&gt; off time share</td>
+<td>[%]</td>
+<td>Time share the electric motor is not energized during the cycle.</td>
+</tr>
+<tr class="even">
 <td>BusAux PS air consumed</td>
 <td>[Nl]</td>
 <td>Total air consumed by the pneumatic system.</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>BusAux PS air generated</td>
 <td>[Nl]</td>
 <td>Total air generated by the pneumatic compressor. Difference to “BusAux PS air consumed” is corrected in the <a href="#engine-fuel-consumption-correction">post-processing</a></td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>E_PS_compressorOff</td>
 <td>[kWh]</td>
 <td>Total energy demand for the pneumatic compressor if no air would be generated (compressor always in drag)</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_PS_compressorOn</td>
 <td>[kWh]</td>
 <td>Total mechanical work for the pneumatic compressor to generate “BusAux PS air generated”</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>E_BusAux_ES_consumed</td>
 <td>[kWh]</td>
 <td>Total electric energy for all electric consumers</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_BusAux_ES_generated</td>
 <td>[kWh]</td>
 <td>Total electric energy generated</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>ΔE_BusAux_Bat</td>
 <td>[kWh]</td>
 <td>In case of smart electrics, the difference of energy stored in the RESS between the beginning and end of the driving cycle. This energy difference is corrected in the post-processing</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_BusAux_PS_corr</td>
 <td>[kWh]</td>
 <td>Mechanical energy of the pneumatic system that needs to be considered in the post-processing to <a href="#engine-fuel-consumption-correction">correct the total fuel consumption</a></td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>E_BusAux_ES_mech_corr</td>
 <td>[kWh]</td>
 <td>Mechanical energy of the electric system that needs to be considered in the post-processing to <a href="#engine-fuel-consumption-correction">correct the total fuel consumption</a></td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_BusAux_HVAC_mech</td>
 <td>[kWh]</td>
 <td>Mechancial energy demand of the HVAC system</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>E_BusAux_HVAC_el</td>
 <td>[kWh]</td>
 <td>Electrical energy demand of the HVAC system</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_BusAux_AuxhHeater</td>
 <td>[kWh]</td>
 <td>Energy demand of an additional aux heater.</td>
 </tr>
-<tr class="odd">
-<td>E_PTO_CONSUM</td>
-<td>[kWh]</td>
-<td>Total energy demand of the pto consumer (if a pto consumer was used).</td>
-</tr>
 <tr class="even">
-<td>E_PTO_TRANSM</td>
-<td>[kWh]</td>
-<td>Total energy demand of the pto transmission (if a pto transmission was used).</td>
-</tr>
-<tr class="odd">
 <td>E_WHR_el</td>
 <td>[kWh]</td>
-<td>Total electric energy generated by an electrical WHR system</td>
+<td>Energy from the electric WHR system</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>E_WHR_mech</td>
 <td>[kWh]</td>
-<td>Total electric energy generated by an electrical WHR system</td>
-</tr>
-<tr class="odd">
-<td>E_aux_ess_mech</td>
-<td>[kWh]</td>
-<td>Total work of auxiliaries during engine stop and thus not considered in FC-Map and FC-AAUX. Considered in FC-ESS_Corr via <a href="#engine-fuel-consumption-correction">fuel consumption correction</a> (Based on P_aux_ESS_mech in .vmod)</td>
+<td>Energy from the mechanical WHR system</td>
 </tr>
 <tr class="even">
 <td>E_ice_start</td>
@@ -6866,14 +7132,24 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>Number of times the combustion engine is started</td>
 </tr>
 <tr class="even">
-<td>k_vehline</td>
-<td>[g/kWh]</td>
-<td>Slope of the regression line derived from all operating points P_wheel vs. FC_final_mod where P_wheel &gt; 0 and FC_final_mod &gt; 0</td>
+<td>E_PTO_CONSUM</td>
+<td>[kWh]</td>
+<td>Total energy demand of the pto consumer (if a pto consumer was used).</td>
 </tr>
 <tr class="odd">
-<td>k_engline</td>
-<td>[g/kWh]</td>
-<td>Slope of the regression line used for the <a href="#engine-fuel-consumption-correction">fuel consumption correction</a></td>
+<td>E_PTO_TRANSM</td>
+<td>[kWh]</td>
+<td>Total energy demand of the pto transmission (if a pto transmission was used).</td>
+</tr>
+<tr class="even">
+<td>E_WHR_el</td>
+<td>[kWh]</td>
+<td>Total electric energy generated by an electrical WHR system</td>
+</tr>
+<tr class="odd">
+<td>E_WHR_mech</td>
+<td>[kWh]</td>
+<td>Total electric energy generated by an electrical WHR system</td>
 </tr>
 <tr class="even">
 <td>E_aux_PTO_RoadSweeping</td>
@@ -6886,150 +7162,45 @@ CycleTime,UnknownCycleName,3600</code></pre>
 <td>Total energy demand of the pto activation in mode 3 (engineering mode only.</td>
 </tr>
 <tr class="even">
+<td>E_aux_ess_mech</td>
+<td>[kWh]</td>
+<td>Total work of auxiliaries during engine stop and thus not considered in FC-Map and FC-AAUX. Considered in FC-ESS_Corr via <a href="#engine-fuel-consumption-correction">fuel consumption correction</a> (Based on P_aux_ESS_mech in .vmod)</td>
+</tr>
+<tr class="odd">
 <td>a</td>
 <td>[m/s<sup>2</sup>]</td>
 <td>Average acceleration</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>a_pos</td>
 <td>[m/s<sup>2</sup>]</td>
 <td>Average acceleration in acceleration phases (a<sub>3s</sub> &gt; 0.125 [m/s<sup>2</sup>], a<sub>3s</sub> = 3-seconds-averaged acceleration)</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>a_neg</td>
 <td>[m/s<sup>2</sup>]</td>
 <td>Average deceleration in deceleration phases (a<sub>3s</sub> &lt; 0.125 [m/s<sup>2</sup>], a<sub>3s</sub> = 3-seconds-averaged acceleration)</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>AccelerationTimeShare</td>
 <td>[%]</td>
 <td>Time share of acceleration phases (a<sub>3s</sub> &gt; 0.125 [m/s<sup>2</sup>], a<sub>3s</sub> = 3-seconds-averaged acceleration)</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>DecelerationTimeShare</td>
 <td>[%]</td>
 <td>Time share of deceleration phases (a<sub>3s</sub> &lt; 0.125 [m/s<sup>2</sup>], a<sub>3s</sub> = 3-seconds-averaged acceleration)</td>
 </tr>
-<tr class="odd">
+<tr class="even">
 <td>CruiseTimeShare</td>
 <td>[%]</td>
 <td>Time share of cruise phases (-0.125 ≤ a<sub>3s</sub> ≤ 0.125 [m/s<sup>2</sup>])</td>
 </tr>
-<tr class="even">
+<tr class="odd">
 <td>StopTimeShare</td>
 <td>[%]</td>
 <td>Time share of stop phases (v &lt; 0.1 [m/s])</td>
 </tr>
-<tr class="odd">
-<td>E_EM_&lt;POS&gt;_drive</td>
-<td>[kWh]</td>
-<td>Mechanical energy applied at the drivetrain by the electric machine at position <em>POS</em> to drive the vehicle</td>
-</tr>
-<tr class="even">
-<td>E_EM_&lt;POS&gt;_gen</td>
-<td>[kWh]</td>
-<td>Mechanical energy at the drivetrain recuperated by the electric machine at position <em>POS</em></td>
-</tr>
-<tr class="odd">
-<td>η_EM_&lt;POS&gt;_drive</td>
-<td>[-]</td>
-<td>Average efficiency at the drivetrain of the electric machine when the electric machine drives the vehicle. Based on the mechanical energy at the drivetrain and the electric power.</td>
-</tr>
-<tr class="even">
-<td>η_EM_&lt;POS&gt;_gen</td>
-<td>[-]</td>
-<td>Average efficiency at the drivetrain of the electric machine when the electric machine generates electric energy. Based on the mechanical energy at the drivetrain and the electric power</td>
-</tr>
-<tr class="odd">
-<td>E_EM_&lt;POS&gt;-em_drive</td>
-<td>[kWh]</td>
-<td>Mechanical energy at the electric motor shaft applied by the electric machine at position <em>POS</em> to drive the vehicle</td>
-</tr>
-<tr class="even">
-<td>E_EM_&lt;POS&gt;-em_gen</td>
-<td>[kWh]</td>
-<td>Mechanical energy at the electric motor shaft recuperated by the electric machine at position <em>POS</em></td>
-</tr>
-<tr class="odd">
-<td>η_EM_&lt;POS&gt;-em_drive</td>
-<td>[-]</td>
-<td>Average efficiency of the electric machine when the electric machine drives the vehicle. Based on the mechanical energy at the electric motor shaft and the electric energy.</td>
-</tr>
-<tr class="even">
-<td>η_EM_&lt;POS&gt;-em_gen</td>
-<td>[-]</td>
-<td>Average efficiency of the electric machine when the electric machine generates electric energy. Based on the mechanical energy at the electric motor shaft and the electric energy.</td>
-</tr>
-<tr class="odd">
-<td>n_EM_&lt;POS&gt;_avg</td>
-<td>[rpm]</td>
-<td>Average angular speed of the electric machine</td>
-</tr>
-<tr class="even">
-<td>E_EM_&lt;POS&gt;_off_loss</td>
-<td>[kWh]</td>
-<td>Total losses added by the electric machine when the electric machine is not energized (i.e., the electric machine’s drag losses)</td>
-</tr>
-<tr class="odd">
-<td>E_EM_&lt;POS&gt;_transm_loss</td>
-<td>[kWh]</td>
-<td>Losses of the transmission stage in the electric motor component.</td>
-</tr>
-<tr class="even">
-<td>E_EM_&lt;POS&gt;-em_loss</td>
-<td>[kWh]</td>
-<td>Total losses of the electric motor component. Calculated from P_<POS>-em_loss</td>
-</tr>
-<tr class="odd">
-<td>E_EM_&lt;POS&gt;_loss</td>
-<td>[kWh]</td>
-<td>Losses of the electric machine. Calculated from P_<POS>_loss</td>
-</tr>
-<tr class="even">
-<td>EM &lt;POS&gt; off time share</td>
-<td>[%]</td>
-<td>Time share the electric motor is not energized during the cycle.</td>
-</tr>
-<tr class="odd">
-<td>Battery Start SoC</td>
-<td>[%]</td>
-<td>Battery state of charge at the beginning of the simulation run</td>
-</tr>
-<tr class="even">
-<td>Battery End SoC</td>
-<td>[%]</td>
-<td>Battery state of charge at the end of the simulation run</td>
-</tr>
-<tr class="odd">
-<td>Battery Delta SoC</td>
-<td>[kWh]</td>
-<td>Difference of the energy stored in the battery between the beginning and end of the simulation run</td>
-</tr>
-<tr class="even">
-<td>E_Batt_loss</td>
-<td>[kWh]</td>
-<td>Total losses in the battery due to its internal resistance</td>
-</tr>
-<tr class="odd">
-<td>E_Batt_T_chg</td>
-<td>[kWh]</td>
-<td></td>
-</tr>
-<tr class="even">
-<td>E_Batt_T_dischg</td>
-<td>[kWh]</td>
-<td></td>
-</tr>
-<tr class="odd">
-<td>E_Batt_int_chg</td>
-<td>[kWh]</td>
-<td></td>
-</tr>
-<tr class="even">
-<td>E_Batt_int_dischg</td>
-<td>[kWh]</td>
-<td></td>
-</tr>
 </tbody>
 </table>
 <p><strong>Note:</strong> The fuel name is only added to the fuel consumption signals for vehicles with dual-fuel engines. In case single-fuel and dual-fuel vehicles are simulated in one simulation run, the fuel consumption for single-fuel vehicles is reported without the fuel name suffix while the fuel consumption of dual fuel vehicles contains the fuel name suffix!</p>
-- 
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