Lp asymptotic stability of 1D damped wave equation with nonlinear distributed damping

Abstract

In this paper, we study the one-dimensional wave equation with localized nonlinear damping and Dirichlet boundary conditions, in the Lp framework, with p∈ [1,∞). We start by addressing the well-posedness problem. We prove the existence and the uniqueness of weak and strong solutions for p∈ [1,∞), under suitable assumptions on the damping function. Then we study the asymptotic behaviour of the associated energy when p ∈ (1,∞), and we provide decay estimates that appear to be almost optimal as compared to a similar problem with boundary damping. Our study is motivated by earlier works, in particular, Haraux2009, Chitour-Marx-Prieur-2020. Our proofs combine arguments from KMJC2022 (wave equation in the Lp framework with a linear damping) with a technique of weighted energy estimates (PM-COCV) and new integral inequalities when p>2, and with convex analysis tools when p∈ (1,2).