Cauchy Problem for Incompressible Neo-Hookean materials

TL;DR

This paper establishes local existence and uniqueness results for the Cauchy problem of incompressible neo-Hookean elasticity in low regularity Sobolev spaces, extending the understanding of well-posedness in nonlinear elasticity.

Contribution

It provides the first low regularity well-posedness results for incompressible neo-Hookean materials, using a novel decomposition of vorticity equations and Strichartz estimates.

Findings

Proved existence and uniqueness for certain Sobolev regularities in 2D and 3D.

Developed a bootstrap argument combining hyperbolic and transport systems.

Extended well-posedness results to low regularity initial data.

Abstract

In this paper we consider the Cauchy problem for neo-Hookean incompressible elasticity in spatial dimension $d \geq 2$. We are here interested primarily in the low regularity case, $s \le s_{crit}=d/2+1$. For $d = 2, 3$, we prove existence and uniqueness for $s_0 < s\le s_{crit}$, and we can prove well-posedness, but for a smaller range, $s_1 < s \le s_{crit}$, \begin{align*} \text{if $d=2$}{}&, \quad s_0 = \frac74, \quad s_1= \tfrac74 + \tfrac{\sqrt{65}-7}{8} \\ \text{if $d=3$}{}&, \quad s_0 = 2, \quad s_1 = 1 + \sqrt{\tfrac32} \end{align*} We consider the initial deformations of the form $x(0, \xi) = A \xi + \varphi(\xi)$, where $A$ is a constant $SL(d, \mathbb{R})$ matrix, and $\varphi \in H^{s+1}$. For the full range (in $s$) results, as indicated above, we need additional H\"older regularity assumptions on certain combinations of second order derivatives of $\varphi$. A key observation in the proof is that the equations of evolution for the vorticities decomposes into a first-order hyperbolic system, for which a Strichartz estimate holds, and a coupled transport system. This allows one to set up a bootstrap argument to prove local existence and uniqueness. Continuous dependence on initial data is proved using an argument inspired by Bona and Smith, and Kato and Lai, with a modification based on new estimates for Riesz potentials. The results of this paper should be compared to what is known for the ideal fluid equations, where, as shown by Bourgain and Li, the requirement $s > s_{crit}$ is necessary.