Tokyo/Works/Simulation

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Works top  0.Hybrid promoter  1.Formulation  2.Assay1  3.Simulation  4.Assay2  5.Future works

Multi-cell simulations with Hill coefficients of the promoters were carried out to find ranges of other parameters that lead the system to balanced differentiation. The differential equations for N cells were constructed to describe the cell population interacting with each other(Ex3.1).

HEREの段落を数式の右に書きたいですが簡単? Here, the concentration of AHL outside of the cells was assumed to be the same concentration of AHL inside the cell because AHL is freely permeable through the membrane of each cell [引用文献番号]. First, the phase plane analysis for the equations was carried out by focusing on an individual cell.


Ex3.1 the differential equations of population model

To analyze the behavior of the cell population, the above differential equations for N cells were extended to the stochastic differential equations(Ex3.2). (see moredetailed誘導) In order to carry out the simulations with the stochastic model, Poisson random variables were introduced into the differential equations. As a result of the stochastic simulation, the different behaviors of individual cells were observed.


Ex3.2 the stochastic differential equations of the population model

In the simulations, Hill coefficients, coefficients of repression and activation of AHL and LacI(n2,n3,k2,k3) determined by the wet experiments were used.


n2 = 2.08 (-)
K2 = 4.05 (μM)
n3 = 2.47 (-)
K3 = 0.295 (μM)

Determining the range of parameter which satisfy coexistent stability

Depending on the value of parameter λ, three different patterns were observed: the pattern with coexistence state of A and B states, the pattern with only A state, and the pattern with only B. The simulation results for their patterns are shown in Fig.1 to 3.

Fig.1.A  t=0.0(min)
Arrow2.JPG
Fig.1.B  t=3.0(min)
Arrow2.JPG
Fig.1.C   t=30(min) only A

⇒ movie here!!

Fig.2.A  t=0.0(min)
Arrow2.JPG
Fig.2.B  t=3.0(min)
Arrow2.JPG
Fig.2.C   t=30(min) A and B are coexistence!!

⇒ movie here!!

Fig.3.A  t=0.0(min)
Arrow2.JPG
Fig.3.B  t=3.0(min)
Arrow2.JPG
Fig.3.C   t=30(min) only B

⇒ movie here!!


The nullclines changed dependent on the state of the cell population. When there are only B cells, the nullclines had one intersection in the phase plane. As change of the state of the cell population, the number of the intersections of nullclines turned into two. Fig.4.A-C shows the appearance of an additional intersection, indicating an unstable equilibrium point, for the three patterns, respectively.

Fig.4.A
Fig.4.B
Fig.4.C


⇒ movie about Fig.4.A here!!

⇒ movie about Fig.4.B here!!

⇒ movie about Fig.4.C here!!


In the case of Fig. 4B, the cell population distributed around the unstable equilibrium point. Right after the moment shown in the Fig. 4B, some cells moved to the A state and the other go in the direction of the B state. The division of the direction may have occurred due to the distribution of the population over the both sides of a “watershed” which is a division line lying over the unstable equilibrium point. In another possibility, fluctuation of the cell state might allow coming or going over the division line.


In the case of Fig. 4A, all the cells existed on the A-side rather than the B-side compared to the dividing line. Therefore, all the cells was not able to cross over the dividing line and moved to the A state. In contrast, when all the cells existed on the B-side rather than the A-side ( Fig 4.C), all the cells moved to the B state, similarly.

The range of parameter λ

To determine the range of the value of parameter λ for balanced differentiation, further simulations were carried out by changing the value of λ. As a result, the relationship between the value of λ and the probability of balanced differentiation was determined as shown in Fig.5.

Fig.5

By using parameter λ in this range, we can construct the artificial genetic circuit for balanced differentiation!