Interpolative Refinement of Gap Bound Conditions for Singular Parabolic Double Phase Problems

Abstract

We consider inhomogeneous singular parabolic double phase equations of type ut-div(|Du|p-2Du + a(x,t)|Du|q-2Du)=-div (|F|p-2F + a(x,t)|F|q-2F) in T := × (0,T)⊂ Rn× R, where 2nn+2<p≤ 2, p<q and 0≤ a(·)∈ Cα,α2(T). We establish gradient higher integrability results for weak solutions to the above problems under one of the following two assumptions: u∈ L∞ (T) q≤ p +α(p(n+2)-2n)4, or u∈ C(0,T;Ls()), s≥ 2 q≤ p+α μsn+s, where μs := (p(n+2)-2n)s4. These results yield an interpolation refinement of gap bounds in the singular parabolic double phase setting.