H\"older regularity of doubly nonlinear nonlocal quasilinear parabolic equations in some mixed singular-degenerate regime
Abstract
We study local H\"older regularity of bounded, weak solutions for the nonlocal quasilinear equations of the form \[ (|u|q-2u)t + P.V. ∫Rn |u(x,t) - u(y,t)|p-2(u(x,t)-u(y,t))|x-y|n+sp dy = 0, \] with p∈ (1,∞), q∈ (1,∞) and s ∈ (0,1). Analogous H\"older continuity result in the local case is known in the purely singular case \1<p<2, p<q\, purely degenerate case \2<p, q<p\, scale invariant case \p=q\ and translation invariant case \q=2,1<p<∞\. In the nonlocal setting, H\"older regularity is known when the equation is either translation invariant \q=2, 1<p<∞\ or scale invariant \q=p, 1<p<∞\ or purely degenerate case \2<p, q<p\. Similar strategy can be used to obtain H\"older regularity in the purely singular case \1<p<2, p<q\. In this paper, we adapt several ideas developed over the past few years and combine it with a new intrinsic scaling to prove H\"older regularity in the mixed singular-degenerate range \p,q,2\ < \q + p-11+nsp, 2 + p-11+nsp\. The proof explicitly makes use of the nonlocal nature of the problem and as a consequence, our estimates are not stable at s → 0. We note that the analogous regularity in the local problem remains open.
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