Team:Technion-Israel/Modeling

From 2014.igem.org

(Difference between revisions)
m
m
Line 246: Line 246:
<span class="fraction"><span class="ignored">(</span><span class="numerator"><i>d</i><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span></span><span class="ignored">)/(</span><span class="denominator"><i>dt</i></span><span class="ignored">)</span></span> = <i>α</i><sub><i>AHL</i></sub><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span> − <i>γ</i><sub><i>AHL</i></sub><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span>
<span class="fraction"><span class="ignored">(</span><span class="numerator"><i>d</i><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span></span><span class="ignored">)/(</span><span class="denominator"><i>dt</i></span><span class="ignored">)</span></span> = <i>α</i><sub><i>AHL</i></sub><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span> − <i>γ</i><sub><i>AHL</i></sub><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span>
</div>
</div>
-
 
+
<p>(For a glossary see [1]).</p>
 +
<p>We began to analyze this system by attempting to simplify it, by assuming a steady state solution wherever possible. Using this method (see [2]) we managed to obtain this equation:</p>
 +
<div class="Indented">
 +
<div class="formula">
 +
<span class="fraction"><span class="ignored">(</span><span class="numerator"><i>d</i><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span></span><span class="ignored">)/(</span><span class="denominator"><i>dt</i></span><span class="ignored">)</span></span> = <span class="fraction"><span class="ignored">(</span><span class="numerator"><i>v</i><sub><i>B</i></sub> + <i>v</i><sub><i>A</i></sub><i>k</i><sub><i>A</i></sub><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span><sup>2</sup></span><span class="ignored">)/(</span><span class="denominator">1 + <i>k</i><sub><i>A</i></sub><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span><sup>2</sup></span><span class="ignored">)</span></span> − <i>γ</i><sub><i>AHL</i></sub><span class="symbol">[</span><i>AHL</i><span class="symbol">]</span> + <i>GateI</i>
 +
</div>
 +
</div>
 +
<p>It is clear from the goals of our system, that we want to have some sort of bi-stability in the result, when Gate I is small (see [2]). The answer to whether this condition is met, would obviously depend on the constants of the system for which we could not find a reliable source, but using a simple geometric analysis of the phase space (see [3]), we were able to produce a graph showing for which values of (v_A,v_B) we could configure the system (by changing the IPTG concentration and the OD) to show bi-stability:</p>
 +
<p>map of bi-stability in the alpha system</p>
</center>
</center>
</header>
</header>

Revision as of 08:15, 13 October 2014


Safie by Technion-Israel

Why Should it Work

Why Alpha System Should Work – a deterministic model of alpha system

When modelling our system, we began with the simplest method known – deterministic rate equations. Moreover, from the design it was clear that the most important benchmark for the signal within the system would be the concentration of AHL as a function of time, so we began by modelling this part of our system. It took only a simple derivation (see [1]) to obtain these equations which characterize this part of the system:

(d[mRNALuxI])/(dt) = (vB + vAkA[AHL]2)/(1 + kA[AHL]2) − γmRNALuxI[mRNALuxI] + GateI
(d[LuxI])/(dt) = αLuxI[mRNALuxI] − γLuxI[LuxI]
(d[AHL])/(dt) = αAHL[AHL] − γAHL[AHL]

(For a glossary see [1]).

We began to analyze this system by attempting to simplify it, by assuming a steady state solution wherever possible. Using this method (see [2]) we managed to obtain this equation:

(d[AHL])/(dt) = (vB + vAkA[AHL]2)/(1 + kA[AHL]2) − γAHL[AHL] + GateI

It is clear from the goals of our system, that we want to have some sort of bi-stability in the result, when Gate I is small (see [2]). The answer to whether this condition is met, would obviously depend on the constants of the system for which we could not find a reliable source, but using a simple geometric analysis of the phase space (see [3]), we were able to produce a graph showing for which values of (v_A,v_B) we could configure the system (by changing the IPTG concentration and the OD) to show bi-stability:

map of bi-stability in the alpha system

Why Should it Fail
Synthetic Biofilm Formation