Higher differentiability results in the scale of Besov spaces to a class of double-phase obstacle problems

Abstract

We study the higher fractional differentiability properties of the gradient of the solutions to variational obstacle problems of the form gather* \ ∫ F(x,w,Dw) d x \ : \ w ∈ K() \, gather* with F double phase functional of the form equation* F(x,w,z)=b(x,w)(|z|p+a(x)|z|q), equation* where is a bounded open subset of Rn, ∈ W1,p() is a fixed function called obstacle and K()= \ w ∈ W1,p() : w ≥ \ a.e. in \ \ is the class of admissible functions. Assuming that the gradient of the obstacle belongs to a suitable Besov space, we are able to prove that the gradient of the solution preserves some fractional differentiability property.