Existence of variational solutions to doubly nonlinear systems in nondecreasing domains

Abstract

For q ∈ (0, ∞), we consider the Cauchy-Dirichlet problem to doubly nonlinear systems of the form align* ∂t ( |u|q-1u ) - div ( D f(x,u,Du) ) = - Du f(x,u,Du) align* in a bounded noncylindrical domain E ⊂ Rn+1. We assume that x f(x,u,) is integrable, that (u,) f(x,u,) is convex, and that f satisfies a p-coercivity condition for some p ∈ (1,∞). However, we do not impose any specific growth condition from above on f. For nondecreasing domains that merely satisfy Ln+1(∂ E) = 0, we prove the existence of variational solutions u ∈ C0([0,T];Lq+1(E,RN)) via a nonlinear version of the method of minimizing movements. Moreover, under additional assumptions on E and a p-growth condition on f, we show that |u|q-1u admits a weak time derivative in the dual (Vp,0(E)) of the subspace Vp,0(E) ⊂ Lp(0,T;W1,p(,RN)) that encodes zero boundary values.

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