Gradient H\"older regularity for nonlocal double phase equations

Abstract

This paper is devoted to investigating the interior C1, α regularity of viscosity solutions to the nonlocal double phase equations ∫Rd (|u(x)-u(y)|p-2(u(x)-u(y))|x-y|d+sp+a(x,y)|u(x)-u(y)|q-2(u(x)-u(y))|x-y|d+tq)\,dy=0, where 2 p q, s, t∈ (0, 1) with s t, and a(x, y)0. In the degenerate case, we solve the higher regularity issue raised by De Filippis-Palatucci [J. Differential Equations 267 (2019) 547--586]. By assuming the Lipschitz continuity of the modulating coefficient a, we are able to prove that the gradient of solution is H\"older continuous, provided the distance of tq and sp is suitably small. The core challenges consist in precisely characterizing the subtle interaction among the pointwise behaviour of the coefficient a, the growth exponents and the differentiability orders.