Nonlocal Harnack inequalities for nonlocal double phase equations I ; with positive bounded modulating coefficient with no H\"older condition

Abstract

In this paper, by applying the De Giorgi-Nash-Moser theory we prove nonlocal Harnack inequalities for (locally nonnegative in ) weak solutions to nolocal double phase equations equation*cases u =0 & in , \\ u=g & in n casesequation* where ⊂n (n 2) is a bounded domain with Lipschitz boundary, is the nonlocal double phase operator given by equation*split u(x)=&∫n|u(x)-u(y)|p-2(u(x)-u(y))Kps(x,y)\,dy \\ &+∫n(x,y)|u(x)-u(y)|q-2(u(x)-u(y))Kqt(x,y)\,dy, split equation* 0<(x,y) = (y,x) \|\|L(n×n) < and ps qt for 0<s,t<1<p q<. In addition, we get local boundedness with explicit formula and weak Harnack inequalities for their weak supersolutions.