Difference between revisions of "Team:Paris Bettencourt/Model"
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Revision as of 00:51, 20 October 2016
Goals
- To make a computational model to analyze stain-enzyme dynamics
- To find optimum parameters
Results
- Developed a mass-action model to analyze stain dynamics
- A stochastic computational approach using Gillespie algorithm
- A diffusion model using explicit finite difference method for three dimensional modeling
Methods
- Matlab
- ODE solvers
- Gillespie Algorithm
- Explicit Finite Difference method (FDM)
Abstract
To act on stains, an enzyme must be concentrated at the fabric surface. Our project began with the idea that we can effectively increase this concentration with a fabric binding domain (FBD). But does this idea hold up to detailed scrutiny? What is the optimal affinity for a stain removing enzyme? How much activity improvement can we expect to achieve? To answer these questions, we built three models of the enzyme-fabric-stain interaction: a differential equation model, a stochastic process model and a 3D reaction-diffusion model. The results of these models agreed on three main points. At low affinity, enzymes diffuse away from fabric and into solution. At high affinity, enzymes become trapped on clean sections of fabric and are unable to reach the stain. But for a wide range of conditions, enzymatic activity is optimized at a binding activity around 10-4 M. For reference, this affinity is much lower than typical antibody-antigen interactions (10-9 M) and is within reach of our protein engineering methods. Under realistic conditions we predict that an optimal binding domain will improve activity by 100 or 1000 fold.
Motivation and Background
Mass-Action Models
In the simplest model, reactant concentrations are assumed to be uniform throughout the system. We make the mass action assumption: that reaction rates are directly proportional to reactant concentrations. In this way, we can represent the system with just a few simple differential equations. These great advantage of these models is conceptual simplicity and computational speed. It is possible to repeat the simulations many times over large parameter ranges. But it is important to remember that these models do not account for spatial structure. It is as though the fabric has been split into many small pieces and thoroughly mixed.Stochastic Models
With Gillespie simulations, we are able to keep track of individual molecules. This allows us to account for single molecule dynamics that aren't part of mass action modes. In a mass action model, interactions are averaged over large numbers and continuous, but in a Gillespie model they are discrete.For example, a single enzyme may bind and unbind a stain without ever acting on a stain. A disadvantage of Gillespie simulations is that they can only by computed for very small numbers of molecules. They also do not represent spatial structure.Diffusion Models
Using the Method of Explicit Fine Differences, we represent the system as a three-dimensional grid of discrete volumes. Within a volume, reactions are modelled as Mass Action, but species may diffuse between volumes at the borders. This allows us to account for the fact that different volumes contain different amounts of enzymes. In particular, we allow the enzyme-fabric binding to concentrate the enzyme near the fabric, where it is most effective. But it is important to remember that we model only passive diffusion, not active mixing. So this type of modelling may tend to overstate spatial effects.Challenge: Modelling stain removal in a compact washing machine
A typical garment is composed of several square meters of fabric and a typical compact washing machine has a volme of 70 liters.
Figure 1: Schema and reaction equations for an ODE model of stain removal. A An enzyme may reversibly bind to clean fabric or stained fabric. For simplicity we assume that these binding constants are equal. Once the enzyme is bound to stained fabric it may be converted to clean fabric. Stain removal is assumed to be irreversible. B The schema gives rise to two binding equilibria and one irreversible reaction. C Three differential equations capture the dynamics of free enzyme, stain-bound enzyme and clean-fabric-bound enzyme. Not shown are similar equations modeling the unbound stained and clean fabric.
Results
| Key Parameters | |
|---|---|
| Volme of a washing machine | 70 L |
| Volume of a wine stain | 50 μL |
| Malvidin concentration in wine | 200mg/L |
| Area of cotton t-shot | 150000cm^2 |
| Weight of cotton | 20mg/cm^2 |
| Total mass of detergent | 5g |
| Enzyme fraction in detergent | 1% |
| Activity of CatA enzyme | 200s^-1 |
Model1: Mass-Action Model
Figure 2: Computational analysis using Mass-Action model. A The three axis 2D plot consisting of Kd, Stain fraction and stain remaining after 90mins of enzyme degradation. Enzymatic activity is optimized at a binding activity around 10-4 M. B Typical parameters that need to be considered for the computational analysis, the optimum Kd is much lower than typical antibody-antigen interactions (10-9 M).
Figure 3: Stain and bound enzyme percentages estimated using Mass-Action model. A The optimum Kd for stain removal is found to be 1E-4 when stain percentage is plotted against the time of degradation. B The percentage of different forms of enzyme present in the solution such as free form, enzyme-clean fabric complex, enzyme-dirty fabric complex as a function of Kd is shown.
Model2: Stochastic Models
Video 1: Representation of the Stochastic Models. The stochastic simulation has been performed in the optimal conditions determined by the Mass-Action Model, where the Kd = 10^-6 with the stained fraction of 0.05. We can notice that stain degradation is following the logarithmic decay, and that almost all of the enzymes are bound to the fabric (EBc - enzymes bound to clean fabric; EBd - enzymes bound to dirty fabric; E - free enzymes) due to a large kinetic constant of binding compared to the unbinding constant. Additionally, a small fraction of enzymes that binds to the stained fabric is enough to completely remove the stain.
Model3: Diffusion Models
Figure 4: Effect of Kd on the stain and enzyme concentration predicted by diffusion model in a fixed amount of time. A The enzyme fraction bound to fabric reaches a saturation with decrease in Kd. B There is an optimal Kd value at which the stain removal is maximum at a given amount of it which is 10E-3M.
Methods
Mass-Action Model
Stochastic Models
Stochastic simulations of our model were performed by applying the Gilespie algorithm. For this, we had to scale down all of the parameters used in the other two models to capture the behavior of single species. The model assumed that cotton cloth consists of the 10 000 fabric binding units arranged in a square 100 by 100. Some of the fabric binding units are next to a stain, so if an enzyme is bound to the particular unit it has the opportunity to clean the stain. We assumed that there are 5% of such stained units, and we normally distributed them in the center of the fabric. We placed 100 enzymes in our system, and observed the the stain degradation by varying kinetic constants; we were specially interested in binding (kon) and unbinding constant (koff). The simulation is captured in the video in which the enzyme dynamics and stain degradation can be observed in real time.
Diffusion Models
Explicit Finite Different scheme is used to model three dimensional stain - enzyme dynamics. The enzyme is assumed to be homogeneously spread through out the spatial domain at the start of the experiment. The scheme was applied on a reaction and diffusion equation thereafter. No flux boundary condition was applied at all boundaries which specifically meant for zero enzyme loss from the system. One of the boundaries is taken as the shirt with stain (1cm^2 area). The parameters and the initial conditions used in the simulations were chosen as realistic as possible. MATLAB was used to computationally model the system and perform thee simulations.
Attributions
This project was done mostly by Mislav Acman and Mani Sai Suryateja Jammalamadaka.
References
- Enzyme Database- BRENDA
- Numerical Analysis and Optimization, An Introduction to Mathematical Modelling and Numerical Simulation- Grégoire Allaire
+33 1 44 41 25 22/25
igem2016parisbettencourt@gmail.com 