Well-posedness and direct internal stability of coupled non-degenrate Kirchhoff system via heat conduction

Abstract

In the paper under study, we consider the following coupled non-degenerate Kirchhoff system equationP \ aligned & ytt-(∫ | ∇ y |2\,dx) y + =0, & in &\; × (0, +∞)\\ & t- - yt =0, & in &\; × (0, +∞)\\ & y==0,\; & on &\;∂×(0, +∞)\\ %& y=0,\; & on &\;∂×(0, +∞)\\ %& ∂ y=0, & on &\;1×(0, +∞)\\ & y(·, 0)=y0, \; yt(·, 0)=y1,\;(·, 0)=0, \; \; & in &\; \\ aligned . equation where is a bounded open subset of Rn, and be two nonzero real numbers with the same sign and is given by (s)= m0+m1s with some positive constants m0 and m1. So we prove existence of solution and establish its exponential decay. The method used is based on multiplier technique and some integral inequalities due to Haraux and KomornikH1,KOM.