Tokyo/Formulation/5.stochastic differential equation model with poisson random variables

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we introduced the terms of Ex 4-1 into a stochastic process to simulate the sthochastic behavior.we used Poisson random variables as a sthochastic process. Threfore,a stochastic differential equations were given as


Ex 5-1
Table 5


The values of parameters in the right table were used and the results of simulation were shown in Fig 5.1-3.
where α2 = 1(μM) in Fig 5.1,α2 = 2.7(μM) in Fig 5.2,α2 = 4(μM) in Fig 5.3. and it has been estimated that 1(μM) = 1000 molecules (count).

Figure 5.1.A  t=0.2(min)
Arrow2.JPG
Figure 5.1.B  t=0.8(min)
Arrow2.JPG
Figure 5.1.C   t=30(min)   failure only A


Figure 5.2.A  t=0.2(min)
Arrow2.JPG
Figure 5.2.B   t=0.8(min)
Arrow2.JPG
Figure 5.2.C   t=30(min)  success!! coexistence


Figure 5.3.A   t=0.2(min)
Arrow2.JPG
Figure 5.3.B   t=0.8(min)
Arrow2.JPG
Figure 5.3.C   t=30(min)   failure only B



Fig.5.1 indicates that all cells shift to A state in the steady state and Fig 5.3 indicates that all cells shift to B state in the steady state.These results doesn't represent coexistence stable.
Fig.5.2 indicates that in the steady state the cells at A state and that at B state Fig.5.2は,AとBに分かれて安定している.

Figure 5.4.1
Figure 5.4.2
Figure 5.4.3