Removable singularities for Lipschitz fractional caloric functions in time varying domains

Abstract

In this paper we study removable singularities for regular (1,12s)-Lipschitz solutions of the s-fractional heat equation for 1/2<s<1. To do so, we define a Lipschitz fractional caloric capacity and study its critical dimension and the L2-boundedness of a pair of singular integral operators, whose kernels will be the gradient of the fundamental solution of the fractional heat equation and its conjugate.

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