Difference between revisions of "Team:Heidelberg/Modelling/aptakinetics"

Line 18: Line 18:
 
                         <div class="row">
 
                         <div class="row">
 
                             <div class="col-lg-12">
 
                             <div class="col-lg-12">
<table class="table-striped">
+
<table class="table table-striped table-hover">
 
<thead><tr>
 
<thead><tr>
 
     <td>Model species</td>
 
     <td>Model species</td>
Line 26: Line 26:
 
<tbody>
 
<tbody>
 
<tr>
 
<tr>
     <td>$P$</td>
+
     <td rowspan="3">$P$</td>
 
     <td>Basic model variants 1 to 4, 4c</td>
 
     <td>Basic model variants 1 to 4, 4c</td>
 
     <td>\[
 
     <td>\[
 
         \frac{d[P]}{dt}=-k_{on}[T][P]+k_{off}[T_{act}]-k_{deg,P}[P]
 
         \frac{d[P]}{dt}=-k_{on}[T][P]+k_{off}[T_{act}]-k_{deg,P}[P]
 +
        \]
 +
    </td>
 +
</tr>
 +
<tr>
 +
    <td>Variant 4a</td>
 +
    <td>\[
 +
        [P](t)=[P](t_{0})\exp\left(-k_{deg,P}t\right)
 +
        \]
 +
    </td>
 +
</tr>
 +
<tr>
 +
    <td>Variant 4b</td>
 +
    <td>\[
 +
        \frac{d[P]}{dt}=-k_{on}[T][P]+k_{off}[T_{act}]
 
         \]
 
         \]
 
     </td>
 
     </td>

Revision as of 19:57, 18 September 2015

Model species Variant Equation
$P$ Basic model variants 1 to 4, 4c \[ \frac{d[P]}{dt}=-k_{on}[T][P]+k_{off}[T_{act}]-k_{deg,P}[P] \]
Variant 4a \[ [P](t)=[P](t_{0})\exp\left(-k_{deg,P}t\right) \]
Variant 4b \[ \frac{d[P]}{dt}=-k_{on}[T][P]+k_{off}[T_{act}] \]