Stability of initial-boundary value problem for quasilinear viscoelastic equations

Autor:	Kun-Peng Jin, Jin Liang, Ti-Jun Xiao
Jazyk:	angličtina
Rok vydání:	2020
Předmět:	quasilinear viscoelastic equation polynomial and exponential decay relaxation function uniform decay Mathematics QA1-939
Zdroj:	Electronic Journal of Differential Equations, Vol 2020, Iss 85,, Pp 1-15 (2020)
Druh dokumentu:	article
ISSN:	1072-6691
Popis:	We investigate the stability of the initial-boundary value problem for the quasilinear viscoelastic equation $$\displaylines{ |u_t|^{\rho}u_{tt}-\Delta u_{tt}-\Delta u+\int_0^tg(t-s)\Delta u(s)ds=0, \quad \text{in }\Omega\times(0,+\infty),\cr u=0,\quad \text{in }\partial\Omega\times(0,+\infty),\cr u(\cdot, 0)=u_0(x),\quad u_t(\cdot, 0)=u_1(x), \quad \text{in }\Omega, }$$ where $\Omega$ is a bounded domain of $\mathbb{R}^{n}\; (n\geq 1)$ with smooth boundary $\partial\Omega$, $\rho$ is a positive real number, and g(t) is the relaxation function. We present a general polynomial decay result under some weak conditions on g, which generalizes and improves the existing related results. Moreover, under the condition $g'(t)\leq -\xi(t)g^{p}(t)$, we obtain uniform exponential and polynomial decay rates for $1\leq p
Databáze:	Directory of Open Access Journals
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