Difference between revisions of "Team:Warwick/Modelling1"
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Revision as of 21:27, 17 September 2015
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The collaboration focused on two elements:
There are many methods to look at this kind of problems, but the most realistic may require huge computational resources. So it is necessary to find an approach that is experimentally relevant, computationally tractable, and reflecting the biophysics underlying Brixells.
We, Team NTNU Trondheim have offered ideas, modeling frameworks, software simulation, and data analysis to answer these questions, based on information theory and thermodynamics. For Problem 1, we have suggested an approach in terms of binding affinity and specificity where the information entropy is used as a measure of specificity. For Problem 2, we have suggested a thermodynamics approach using the Poisson-Boltzmann theory where the zinc fingers and E. Coli are approximated by a set of beads (one large bead for the E. Coli, small beads for each zinc finger, and a rod of beads for the DNA arm. Team Warwick has been enthusiastic about this approach since it is a stochastic method that they have not considered, and they have provided that us with data related to the geometry of E. Coli-arm formation.
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The probability of bond formation is equal for all different types of fingers can be expressed as the product of the probability of formation for each zinc finger :
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This is a clear measure of how strong the structure is.
The probability of formation for a zinc finger is expressed as a function of the specificity.
where is the product log function and is the specificity which is the information theoretical "mutual information", and is expressed as follows:
That calculates the specificity of one zinc finger, i.e. how well a zinc finger binds specifically to an arm when it is competing with other zinc fingers. is the binding affinity of zinc finger specifically to arm .
The binding affinity is related to the binding probability according to the following equation:
where is the the arm and is the the finger , which are governed by the following ligand-binding reaction:
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In order to account for the arm length. It is important to express the binding affinity to the geometry of the system consisting of one arm and one zinc finger. We dropp the indices and in the following for simplicity.
We approximate the bacteria, the zinc fingers, and the DNA arm by a set of beads. The bacteria becomes one large sphere, the zinc finger one small sphere, and the DNA arm becomes a rod consisting of a cascade of beads.
Using these assumptions, the free energy can be calculated from geometrical and electrochemical considerations. In other words, knowing the positions, radii, and charge magnitudes on the beads, the binding free energy of the system is directly calculated as follows.
where is the bound free energy expressed as:
and is the unbound free energy expressed as:
where and are bead indices, and are the number of beads in each subsystem.
is the distance between two beads. is the radius of a bead , and is the charge magnitude of a bead .where is the electrostatic energy potential expressed as:
is the van Der Waals force potential expressed as:
and is the pair solvent energy expressed as:
with
and
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Table 1 provides the remaining variable values.
Description | Symbol | Value |
---|---|---|
Zinc finger radius | ||
Base pair equivalent bead radius | ||
DNA arm length | ||
DNA arm bead charge magnitude | ||
Real gas constant | ||
Temperature | ||
Absolute permittivity | ||
Relative permittivity of water | ||
Hamaker coefficient of nucleotide | ||
Dielectric constant of water |
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We have simulated the effect of arm length on free energy (low free energy implies high binding probability) using the Born salvation free model, pair van der Waals energy, and electrostatic potential, described above. However, there are some parameters that we are not sure about (Equivalent charge and Hamacker coefficient of Zinc fingers, equivalent charge and Hamacker coefficient of base pair) that depend on charge distribution of the DNA strand, which should be determined experimentally as boundary conditions. Alternatively, one could consider each base pair with independent charge.
The systems have been simulated in MATLAB.
Figure 1 shows a rendering of the bacteria - arm compound (E. Coli in blue, zinc fingers in red, arms in orange).
Figure 2 shows relative free energy against arm length. As expected, the longer the arms, the lower is the free energy, and thus the higher is the bonding probability.
Figure 3 shows relative free energy against arm length, where the distribution of zinc fingers is randomized. We notice that the distribution of the zinc fingers plays a very important role in the binding as shown in the figure where the distribution is varied randomly, but the trend is more and less the same as when the distribution is assumed to be deterministic.
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The bead approximation and thermodynamic information theoretical framework we proposed effectively captures the challenge of modeling binding probability where different DNA strands compete in binding with a multitude of zinc fingers. The model takes into account the geometry and charge magnitude distribution on the bacteria and the DNA strands.
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