H\"older regularity results for parabolic nonlocal double phase problems
Abstract
In this article, we obtain higher H\"older regularity results for weak solutions to nonlocal problems driven by the fractional double phase operator align* L u(x):=&2 \; P.V. ∫ RN |u(x)-u(y)|p-2(u(x)-u(y))|x-y|N+ps1dy &+2 \; P.V. ∫ RN a(x,y) |u(x)-u(y)|q-2(u(x)-u(y))|x-y|N+qs2dy, align* where 1<p≤ q<∞, 0<s2, s1<1 and the modulating coefficient a(·,·) is a non-negative bounded function. Specifically, we prove higher space-time H\"older continuity result for weak solutions of time depending nonlocal double phase problems for a particular subclass of the modulating coefficients. Using suitable approximation arguments, we further establish higher (global) H\"older continuity results for weak solutions to the stationary problems involving the operator L with modulating coefficients that are locally continuous.
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