Structurally damped semilinear evolution equation for positive operators on Hilbert space

TL;DR

This paper investigates decay rates of solutions to a semilinear damped evolution equation with positive operators on Hilbert space under various damping conditions, establishing decay estimates and conditions for global existence.

Contribution

It provides new decay estimates for solutions of a semilinear damped evolution equation with minimal regularity initial data, considering different damping regimes.

Findings

Decay rates improve with higher initial data regularity.

Global existence is established for certain damping and nonlinearity conditions.

Decay estimates are derived for solutions and their derivatives.

Abstract

In this study, we analyze a semilinear damped evolution equation under different damping conditions, including the undamped $(\theta=0)$, effectively damped $(0<2\theta<\sigma)$, critically damped $(2\theta=\sigma)$, and non-effectively damped $(\sigma<2\theta\leq 2\sigma)$. The analysis is conducted in two parts; the present article is devoted to examining decay estimates of solutions to the linear evolution equation governed by a self-adjoint, positive operator $\mathcal{L}$ with discrete spectrum subject to initial Cauchy data of minimal regularity. Specifically, we consider the Cauchy problem: \begin{equation*} \left\{\begin{array}{l} u_{tt}(t)+\mathcal{L}^{\theta}u_{t}(t)+\mathcal{L}^{\sigma}u(t) =0, \quad t>0, u(0)=u_{0}\in\mathcal{H},\quad u_{t}(0)=u_{1}\in\mathcal{H}, \end{array}\right. \end{equation*} in different damping conditions. %More precisely, we study decay estimates for a solution, its time derivative, and space derivative in both cases. Furthermore, we demonstrate that the decay rates of the associated solutions improve with the regularity of the initial Cauchy data. As an application of the decay estimates, we also demonstrate the global existence (in time) of the solution in certain cases, taking into account polynomial-type nonlinearity. In the 2nd article, we will address the remaining instances where global existence cannot be assured and instead present findings on local existence and possible blow-up results.