Equilibrium and Competition in Evolutionary Dynamics

Original Abstract

A fundamental problem in protobiological dynamics is to understand how chemically generated polymers can form persistent sequence distributions before the emergence of replication. We study deterministic polymer growth in which each finite sequence is followed along its genealogical structure. The system pictures an open polymerization cascade in which each polymer is produced from a unique precursor and lost by degradation and further extension. Setting fixed activated precursors, we show global well-posedness, positivity, uniqueness of a strictly positive equilibrium, and exponential convergence to an explicit steady state distribution. Under an additional uniform decay condition, this convergence becomes global exponential stability in a uniform norm. We then couple the polymerization to a shared environmental resource with logistic growth and depletion by two activated precursors. In the resulting binary polymerization competition model, the equilibrium structure is governed by a three-dimensional core subsystem. We prove that strictly positive equilibria exist exactly above a sharp resource threshold. At the threshold the equilibrium is unique, while above it two positive branches appear. The lower branch is unstable and the upper branch is locally stable. For the complete infinite system, we exhibit positivity, global componentwise existence, a priori bounds, and under persistence and dominance assumptions, global exponential stability. Finally, we introduce template directed replication through a replicator term. The pre-replicative equilibrium continues only under neutral fitness, and heterogeneous fitness removes it as an equilibrium of the replicated system.