English

Phenotypic Equilibrium as Probabilistic Convergence in Multi-phenotype Cell Population Dynamics

Populations and Evolution 2022-11-03 v3

Abstract

We consider the cell population dynamics with nn different phenotypes. Both the Markovian branching process model (stochastic model) and the ordinary differential equation (ODE) system model (deterministic model) are presented, and exploited to investigate the dynamics of the phenotypic proportions. We will prove that in both models, these proportions will tend to constants regardless of initial population states ("phenotypic equilibrium") under weak conditions, which explains the experimental phenomenon in Gupta et al.'s paper. We also prove that Gupta et al.'s explanation is the ODE model under a special assumption. As an application, we will give sufficient and necessary conditions under which the proportion of one phenotype tends to 00 (die out) or 11 (dominate). We also extend our results to non-Markovian cases.

Keywords

Cite

@article{arxiv.1410.5548,
  title  = {Phenotypic Equilibrium as Probabilistic Convergence in Multi-phenotype Cell Population Dynamics},
  author = {Da-Quan Jiang and Yue Wang and Da Zhou},
  journal= {arXiv preprint arXiv:1410.5548},
  year   = {2022}
}
R2 v1 2026-06-22T06:30:39.652Z