Maximal Lp-regularity for x-dependent fractional heat equations with Dirichlet conditions
Abstract
We prove optimal regularity results in Lp-based function spaces in space and time for a large class of linear parabolic equations with a nonlocal elliptic operator in bounded domains with limited smoothness. Here the nonlocal operator is given by a strongly elliptic and even pseudodifferential operator of order 2a (0<a<1) with nonsmooth x-dependent coefficients. This includes the prominent case of the fractional Laplacian (-)a, as well as elliptic operators (-∇ · A(x)∇+b(x))a. The proofs are based on general results on maximal Lp-regularity and its relation to R-boundedness of the resolvent of the associated (elliptic) operator. Finally, we apply these results to show existence of strong solutions locally in time for a class of nonlinear nonlocal parabolic equations, which include a fractional nonlinear diffusion equation and a fractional porous medium equation after a transformation. The nonlinear results are new for operators on domains with boundary; the linear results are so when P is x-dependent nonsymmetric.
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