Existence of variational solutions to doubly nonlinear nonlocal evolution equations via minimizing movements

Abstract

We prove existence of variational solutions for a class of doubly nonlinear nonlocal evolution equations whose prototype is the double phase equation align* ∂t um &+ P.V.∫RN |u(x,t)-u(y,t)|p-2(u(x,t)-u(y,t))|x-y|N+ps\\&+a(x,y)|u(x,t)-u(y,t)|q-2(u(x,t)-u(y,t))|x-y|N+qr \,dy = 0,\,m>0,\,p>1,\,s,r∈ (0,1). align* We make use of the approach of minimizing movements pioneered by DeGiorgi and Ambrosio and refined by B\"ogelein, Duzaar, Marcellini, and co-authors to study nonlinear parabolic equations with non-standard growth.