On the Moore-Gibson-Thompson equation with memory with nonconvex kernels
Abstract
We consider the MGT equation with memory ∂ttt u + α ∂tt u - β ∂t u - γ u + ∫0tg(s) u(t-s) ds = 0. We prove an existence and uniqueness result removing the convexity assumption on the convolution kernel g, usually adopted in the literature. In the subcritical case αβ>γ, we establish the exponential decay of the energy, without leaning on the classical differential inequality involving g and its derivative g', namely, g'+δ g≤ 0,δ>0, but only asking that g vanishes exponentially fast.
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