Paris/Continuous model

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Well mixed population model

We present here a theoretical approach based on population dynamics. We consider here the case of a well mixed, homogeneous, culture of the SMB organism, i.e. there is no space in this analysis and we follow only the variation of the different cell lines concentrations in the culture volume.


Derivation of the model

Let the variables g, s and d describe respectively the concentrations of germinal and somatic cells and the concentration of DAP, then we can write for our system:


Eq1.jpg


Equation (1a) describes the growth of the germinal cell population in presence of sufficient DAP (interaction represented by the Michaelis-Menten function) ; the term proportional to α2 is the differentiation into somatic cells by recombination of the CRE/LOX box, and the last term proportional to α3 is the germinal cells’ death. Equation (1b) is the variation of the somatic cells’ population, with the term proportional to α4 for somatic cells’ death. The last line describes DAP production by the somatic cells, and includes a degradation term. In absence of any quantitative details on assimilation of DAP by germinal cells and response to DAP levels, n and k are are to be considered as arbitrary phenomenological parameters. We take however in the following n = 1 neglecting potential saturation related non-linearities for high DAP concentrations. The value of k corresponds to the DAP concentration for half-maximal growth rate, and could set experimentally. We simplify the previous system by assuming that the evolution of d is rapid compared to the cellular growth, so that at this time scale we can take d' = 0 and write d = s α5/ α6 . This gives the two-variable system:


Eq2.jpg


Redefinition of parameters k → kα6 /α5 and α3 → α2 + α3 leads to the simpler writing:


Eq3.jpg


Let us do some rewriting:


Eq4.jpg


and by redefining the time and most of the parameters we get:


Eq5.jpg


The fixed points are (g = 0, s = 0) and the solution of:


Eq6.jpg


Analysis of stability

Fixed point at the origin

Let us linearize the system (5a) close to the origin. For small perturbations around (g = 0, s = 0) (5a) is equivalent to :

Eq7.jpg


We look for a solution of the form Inline7.jpg , with Inline8.jpg an arbitrary vector. The values of λ are the eigenvalues of the matrix in (7) and can be obtain here straightforwardly by the characteristic polynomial : λ1 = −b, λ2 = −1, with respectively the eigenvectors Inline9.jpg.

The two eigenvalues are always negative : the origin is therefore always an attractive fixed point. For too weak initial concentrations of the two cellular types, the system is always going to die out.

Second fixed point, out of the origin

Let (g0 := β s0 , s0 := k/(α−1) ) be the non trivial solution of (6a). We can simplify the (5a) by dividing the two equations respectively by g0 et s0 and by taking as new variables G := g/g0 and S := s/s0:

Eq8.jpg


and with μ := α−1 = α1/α2− 1 :

Eq9.jpg


The fixed point is now (G0=1,S0=1). We linearize system (9a) around this point and look for a solution close to it. Take x := G−G0 and y := S−S0 , close to (G0,S0) we can write by keeping only the first order term of (9a) :


Eq10.jpg


Looking for a solution of the form Inline7.jpg, we need to find the eigenvalues of the matrix in (10). Solving the characteristic polynomial gives :


Eq1112.jpg


In order to determine the stability of the fixed point, let us examine the signs of the eigenvalues : λ1 is always negative, while λ2 is positive if μ/1+μ > 0. That is, by returning to the original parameters of (1) if α1 > α2 (more growth than recombination). In this case (which is expected) the fixed point (G0, S0) is unstable and the populations of the two cell lines diverge.

Conclusion

If we put together the results on the two fixed points we get the situation represented on the following diagram :

Diagram.jpg

For a region around the origin and below some line passing through (G0, S0) any initial conditions converges to the origin. For higher values of the initial conditions we always expect exponential growth of the populations. Indeed, if in the unstable case, we extrapolate the asymptotic behaviour of our system, (2), we expect both population to grow, at some point the Michaelis-Menten term saturates, and equation (2a) becomes g' = (α1-α2-α3)g. The solution is a exponential with a positif exponent in this case.


It is interesting for comparaison with experimental measurements to evaluate the asymp- totic behaviour of the ratio of the growth rate over population size g'/g. For this discussion and without loss of generality in the treatment (implies only a redefinition of the parameter α2 ) we neglect cell death, we will also keep n = 1 for the reason mentioned before. From the preceeding paragraph we see that tha population of g cannot grow for α1 = α2 , that is when the time for cell division (α1)^(-1) is equal to the generation time of somatic cells (α2)^(-1) . Both cell types have the same growth rate, in our system it means that for each germinal cell division there is one recombination of the CRE-LOX box and the generation of one somatic cell. This means that we need less than 50% recombination probability in order for our system to work. For recombination rates α2 (for fixed α1 ) close to this limit, the growth rate over population size curve as a function α2 is a straight line with negative slope g'/g = α1 − α2 , going to zero at 50% recombination probability.