The Planar Coleman--Gurtin model with Beltrami conductivity

Abstract

This article addresses the planar Coleman--Gurtin heat equation with memory on a bounded domain, with rough anisotropic diffusion Aμ, typical of heterogeneous or composite media and encoded by a Beltrami coefficient μ∈ L∞() satisfying \|μ\|∞<1. First, under no additional smoothness assumptions on μ, solutions with H10()-based initial data enter a time-averaged L∞() regime, and instantaneously regularize into the second-order graph space D(Aμ). Assuming in addition μ∈ W1,2(), this regularization upgrades to W2,p() for every 1<p<2, and we construct regular global and exponential attractors of finite fractal dimension, for both the L2() and H10()-based dynamics. The proof combines the instantaneous smoothing method of Chekroun, Di Plinio, Glatt-Holtz and Pata with maximal parabolic regularity for divergence-form operators with measurable coefficients, and with planar quasiconformal Beltrami estimates recently obtained in work by Green, Wick and the author.

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