From prelife to life: a bio-inspired toy model

TL;DR

This paper introduces a bio-inspired lattice model simulating polymer growth and interactions, revealing a phase transition and symmetry breaking that may relate to biological evolution's prelife-to-life transition.

Contribution

It develops a novel one-dimensional lattice model with transfer matrix and Monte Carlo analysis, connecting polymer dynamics to biological evolution and phase transitions.

Findings

Identifies a critical line in the phase diagram separating finite and infinite polymer phases.

Demonstrates dynamical symmetry breaking leading to polymer length divergence.

Provides insights into prelife-to-life transition through a simplified statistical model.

Abstract

We study a one-dimensional lattice of $N$ sites each occupied by a mathematical "polymer," that is, is a binary random sequence of arbitrary length $n$, or equivalently, a rooted path of $n$ links on an infinite binary tree. The average polymer length is controlled by the monomer fugacity $z$. A pair of polymers on adjacent sites carries a weight factor $\omega$ for each link on the tree that they have in common. The phase diagram in the $z\omega$ plane exhibits a critical line $z=z_{\rm c}(\omega)$. For $z<z_{\rm c}(\omega)$ there exists an equilibrium phase with, in particular, a finite average polymer length. We investigate the equilibrium ensemble by transfer matrix and Monte Carlo methods, paying particular attention to the vicinity of the critical line. For $z>z_{\rm c}(\omega)$ the equilibrium is unstable and Monte Carlo time evolution brings about a dynamical symmetry breaking which favors the evolution of a small selection of polymers to ever greater length. While of interest for its own sake, this model may also be relevant to the prelife-to-life transition that has occurred during biological evolution. We compare it to existing models of similar simplicity due to Wu and Higgs (2009, 2012) and to Chen and Nowak (2012).