Lipschitz regularity for parabolic fractional p-Laplace equations
Abstract
We prove that local weak solutions to nonlocal parabolic p-Laplace equations are locally Lipschitz continuous in space, uniformly in time for every 1<p<∞ and s ∈ (0,1) whenever sp > p-1. Our results hold for symmetric, translation-invariant kernels satisfying standard ellipticity bounds, including kernels that may be discontinuous and require only that the tail of the solution be bounded. In the linear case, our proof provides a different route avoiding blow up arguments and Liouville theorems.
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