On a mixed local-nonlocal evolution equation with singular nonlinearity

Abstract

We will prove several existence and regularity results for the mixed local-nonlocal parabolic equation of the form eqnarray split ut- u+(-)s u&=f(x,t)uγ(x,t) in T:= ×(0, T), \\ u&=0 in (Rn ) ×(0, T), \\ u(x, 0)&=u0(x) in ; split eqnarray where equation* (- )s u= cn,sP.V.∫Rnu(x,t)-u(y,t)|x-y|n+2s d y. equation* Under the assumptions that γ is a positive continuous function on T and is a bounded domain %of class C1,1 with Lipschitz boundary in Rn, n> 2, s∈(0,1), 0<T<+∞, f≥ 0, u0≥ 0, f and u0 belongs to suitable Lebesgue spaces. Here cn,s is a suitable normalization constant, and P.V. stands for Cauchy Principal Value.