Higher integrability for parabolic double phase equations with an improved gap bound

Abstract

We prove a local higher integrability result for the gradient of Hölder continuous weak solutions to the parabolic double phase equation \[ ∂t u - div (|Du|p-2Du + a(z)|Du|q-2Du) = 0 in ΩT. \] We work under a relaxed gap condition on the exponents p and q. The coefficient a is assumed to belong to the class Zκ(ΩT) for some κ∈ (0,∞). The functions in this class satisfy a one-sided pointwise bound that controls how fast a can grow away from its zero set, and the class contains the Hölder continuous functions. We also impose a mild almost increasing condition on a, which motivates the introduction of a new mollification, which we call the slanted Steklov average. For u ∈ C0,γ,γ/qloc(ΩT) with γ∈ [0,1), our main result holds under the gap bound equationGeq:G 2 p q p + qκq - 2γ. equation The new gap condition eq:G is purely parabolic in nature and is stricter than the optimal gap relation associated with the Lavrentiev phenomenon for the elliptic double phase functional.