Asymptotic mean value properties for the elliptic and parabolic double phase equations

Abstract

We characterize an asymptotic mean value formula in the viscosity sense for the double phase elliptic equation - div( ∇ u p-2∇ u+ a(x)∇ u q-2∇ u)=0 and the normalized double phase parabolic equation ut=∇ u 2-p div( ∇ u p-2∇ u+ a(x,t)∇ u q-2∇ u), 1<p≤ q<∞. This is the first mean value result for such kind of nonuniformly elliptic and parabolic equations. In addition, the results obtained can also be applied to the p(x)-Laplace equations and the variable coefficient p-Laplace type equations.

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