The Peskin problem with $\dot B^1_{\infty,\infty}$ initial data

TL;DR

This paper establishes local and global well-posedness results for the 2D Peskin problem with initial data in a non-Lipschitz Besov space, showing solutions converge exponentially to equilibrium.

Contribution

It provides the first well-posedness results for the Peskin problem with initial data in the Besov space _{,,} and demonstrates exponential convergence to equilibrium.

Findings

Local well-posedness for initial data in _{,,} with well-stretched condition.

Global well-posedness for initial data close to equilibrium in _{,,}.

Solutions converge exponentially to equilibrium as time approaches infinity.

Abstract

In this paper we study the Peskin problem in 2D, which describes the dynamics of a 1D closed elastic structure immersed in a steady Stokes flow. We prove the local well-posedness for arbitrary initial configuration in $(C^2)^{\dot B^1_{\infty,\infty}}$ satisfying the well-stretched condition, and the global well-posedness when the initial configuration is sufficiently close to an equilibrium in $\dot B^1_{\infty,\infty}$. Here $(C^2)^{\dot B^1_{\infty,\infty}}$ is the closure of $C^2$ in the Besov space $\dot B^1_{\infty,\infty}$. The global-in-time solution will converge to an equilibrium exponentially as $t\rightarrow+\infty$. This is the first well-posedness result for the Peskin problem with non-Lipschitz initial data.