Optimal global second-order regularity and improved integrability for parabolic equations with variable growth

Abstract

We consider the homogeneous Dirichlet problem for the parabolic equation \[ ut- div (|∇ u|p(x,t)-2 ∇ u)= f(x,t) + F(x,t, u, ∇ u) \] in the cylinder QT:=× (0,T), where ⊂ RN, N≥ 2, is a C2-smooth or convex bounded domain. It is assumed that p∈ C0,1(QT) is a given function, and that the nonlinear source F(x,t,s, ) has a proper power growth with respect to s and . It is shown that if p(x,t)>2(N+1)N+2, f∈ L2(QT), |∇ u0|p(x,0)∈ L1(), then the problem has a solution u∈ C0([0,T];L2()) with |∇ u|p(x,t) ∈ L∞(0,T;L1()), ut∈ L2(QT), obtained as the limit of solutions to the regularized problems in the parabolic H\"older space. The solution possesses the following global regularity properties: \[ split & |∇ u|2(p(x,t)-1)+r∈ L1(QT) for any 0 < r < 4N+2, \\ & |∇ u|p(x,t)-2 ∇ u ∈ W1,2(QT)N. split \]