English

The exchange-driven growth model: basic properties and longtime behavior

Mathematical Physics 2020-06-04 v3 Dynamical Systems math.MP Probability

Abstract

The exchange-driven growth model describes a process in which pairs of clusters interact through the exchange of single monomers. The rate of exchange is given by an interaction kernel KK which depends on the size of the two interacting clusters. Well-posedness of the model is established for kernels growing at most linearly and arbitrary initial data. The longtime behavior is established under a detailed balance condition on the kernel. The total mass density ϱ\varrho, determined by the initial data, acts as an order parameter, in which the system shows a phase transition. There is a critical value ϱc(0,]\varrho_c\in (0,\infty] characterized by the rate kernel. For ϱϱc\varrho \leq \varrho_c, there exists a unique equilibrium state ωϱ\omega^\varrho and the solution converges strongly to ωϱ\omega^\varrho. If ϱ>ϱc\varrho > \varrho_c the solution converges only weakly to ωϱc\omega^{\varrho_c}. In particular, the excess ϱϱc\varrho - \varrho_c gets lost due to the formation of larger and larger clusters. In this regard, the model behaves similarly to the Becker-D\"oring equation. The main ingredient for the longtime behavior is the free energy acting as Lyapunov function for the evolution. It is also the driving functional for a gradient flow structure of the system under the detailed balance condition.

Keywords

Cite

@article{arxiv.1811.05954,
  title  = {The exchange-driven growth model: basic properties and longtime behavior},
  author = {André Schlichting},
  journal= {arXiv preprint arXiv:1811.05954},
  year   = {2020}
}

Comments

34 pages, minor revised version accepted at the Journal of Nonlinear Science

R2 v1 2026-06-23T05:15:42.953Z