Team:ETH Zurich/Modeling/Analytical Approximation

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Revision as of 00:31, 29 October 2011

Can you feel the smoke tonight?
 

Contents

Analytical Approximation


Steady State Gradient Approximation

We derived the gradient formation dynamics analytically already in the reaction-diffusion model. However, there we only solved the resulting partial differential equation numerically. Here, we are going to venture forth and give a suitable analytical approximation!

Kolmogorov-Petrovsky-Piskounov Equation

In mathematics, the problem posed by general reaction-diffusion systems form is known as the Kolmogorov-Petrovsky-Piskounov Equation. In the case of acetaldehyde as diffusing and reacting molecule, the equation has the following general structure:

General Kolmogorov-Petrovsky-Piskounov partial differential equation for an acetaldehyde-based reaction-diffusion system. D(AcAl(x,z),z) is the diffusive term, R(AcAl(x,z)) is the uniform (independent of the spatial z coordinate) reaction term.


In our case, it has the following, less general form we already derived analytically for the reaction-diffusion model for acetaldehyde:
Kolmogorov-Petrovsky-Piskounov partial differential equation for our system, as derived in the reaction-diffusion model for acetaldehyde.

Boundary Conditions

For the analytical approximation of the acetaldehyde gradient, we only consider the boundary condition that the concentration at the reservoir (located at z = 0) stays constant:

[http://en.wikipedia.org/wiki/Dirichlet_boundary_condition Dirichlet Boundary Condition] for the concentration of acetaldehyde at the reservoir

This is in contrast to the full model, where we enforce that no diffusion occurs through the opening at the side of the channel which is closed and not connected to the reservoir. However, we will see that for our circuit, this assumption is valid as long as we are inside the detection range of our circuit, which is the case that we are interested in. In the end, we can also detect if we go out of detection range in the analytical model and make sure this assumption holds.

Solution at Steady State

At steady state, we have to solve the KPP equation for the time derivative set to zero, i.e.

Steady-State Kolmogorov-Petrovsky-Piskounov (KPP) Equation

1. Simplification

Before we get started with solving the actual equation, we simplify it by gathering all the parameters we can:

Simplified parameters
Simplified Steady-State Kolmogorov-Petrovsky-Piskounov (KPP) Equation

2. Approximation

Next, we assume that the Michaelis-Menten-type degradation in our KPP operates at or almost at saturation for the relevant part of the gradient. This assumption holds for inputs that are within detection range according to the exact numerical integration of the KPP equation.


This means we can approximate the reaction term around saturation, i.e. AcAl*(z) >> KM,AcAl:

Saturation approximation of the reaction term for AcAl*(z) >> KM,AcAl


We have now arrived at a solvable ordinary differential equation for the acetaldehyde gradient:

Ordinary Differential Equation approximation for acetaldehyde gradient at steady state

3. Partial Analytical Solution

We can solve the ordinary differential equation we derived before by integrating wrt. to z twice, thereby introducing an unknown integration constant κ:

Parital solution with open parameter κ to the ordinary differential equation arising from the KPP equation.

In the approximate solution to the problem, negative concentrations might be obtained due to the presence of the zeroth-order term in the KPP partial differential equation. To determine κ and avoid negative concentrations in the approximate solution, we apply the dead-zone concept.


Dead Zone Concept

The dead zone concept introduces a nonreaction zone. It is an approximation to the Kolmogorov-Petrovsky-Piskounov equation for saturation of Michaelis-Menten kinetics that tends to work better than the orginial boundary conditions [1]. In our case, for the nonreaction zone, we require that

  • no reactant, i.e. acetaldehyde, is present:
    ETHZ-KPP-DeadZone-I.png


  • no diffusion occurs across the dead zone:
    ETHZ-KPP-DeadZone-II.png


The solution to the problem posed by the ODE steady-state approximation of the Kolmogorov-Petrovsky-Piskounov equation and the dead-zone concept gives a value for κ:

ETHZ-KPP-Kappa.png

Analytical Solution

This completes the final equation describing the acetaldehyde gradient at steady state:

Analytical approximation of the acetaldehyde gradient


Finally, we also get an analytical expression for zDeadZone, at which both the acetaldehyde concentration and its gradient are zero:

ETHZ-KPP-zDeadZone.png


GFP Band: Dimensionless Model

1. Nondimensionalized System

We nondimensionalized all species occurring in the equations for the GFP band circuit.

ETHZ-Dimensionless-Species.png


The dimensionless equations for the dynamics of the band-generating system then read

ETHZ-Dimensionless-Band.png

2. Steady State

ETHZ-Dimensionless-Band-SteadyState.png

3. Dimensionless Groupings

The equation system can be simplified by introducing the following dimensionless groupings:

ETHZ-Dimensionless-Groupings.png


This yields the final equations for steady state:

ETHZ-Dimensionless-Band-SteadyState-Final.png


GFP Band: Approximation & Analysis

1. Splitting of Pathways

ETHZ-Analytical.png

First, we split the band-pass system into both its long and short pathway:

  • Short pathway:
  1. AcAl
  2. TetR
  3. LacIM1
  4. GFP
  • Long pathway:
  1. AcAl
  2. TetR
  3. CI
  4. LacI
  5. GFP


Seperation of LacI Species

We separate the LacI species and their steady state equations in order to compute both pathways independently:

ETHZ-Analytical-LacI.png

2. From GFP to Acetaldehyde

To get from GFP to Acetaldehyde, we have to invert all relevant equations:

Short pathway: Long pathway:
ETHZ-Analytical-ShortPath.png
ETHZ-Analytical-LongPath.png

3. Half-Maximum GFP Activity

We first concentrate on the short pathway and determine for which acetaldehyde concentration it produces half-maximum GFP:

ETHZ-Analytical-GFPHalf-ShortPath.png

Next, we concentrate on the long pathway:

ETHZ-Analytical-GFPHalf-LongPath.png


4. GFP Band Existence

We can now derive a condition that has to be fulfilled in order for the GFP band to exist. Its meaning condenses down to the intuitive fact that the rising flank of the band has to occur "to the left" of the falling one. Mathematically, the condition can be derived from the following expression:

ETHZ-Analytical-GFP-Existence.png

This condition simplifies to

ETHZ-Analytical-GFP-Existence-Final.png

In Figure 1, this means that the dash-dotted red line must be at a lower acetaldehyde concentration than the blue dash-dotted red line. We now analyze what possible outcomes this condition has:

  • Condition holds:
    This case is covered by our actual system implementation. In our system μLacIM1 is over 20 times smaller than the limit required by the condition. This substantiates our belief in the robustness of our system.


  • Corner Case (Equality):
ETHZ-Analytical Corner.png


  • Condition failure:



References

[1] [http://www.ncbi.nlm.nih.gov/pubmed/16209545 Valdés-Parada FJ, Alvarez-Ramírez J, Ochoa-Tapia JA.
An approximate solution for a transient two-phase stirred tank bioreactor with nonlinear kinetics.
Biotechnol Prog. 2005 Sep-Oct;21(5):1420-8.]

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