Mean value formulas for solutions of some degenerate elliptic equations and applications
Abstract
We prove a mean value formula for weak solutions of div(|y|a u)=0 in Rn+1=\(x,y): x∈Rn, y∈R\, -1<a<1 and balls centered at points of the form (x,0). We obtain an explicit nonlocal kernel for the mean value formula for solutions of (-)sf=0 on a domain D of Rn. When D is Lipschitz we prove a Besov type regularity improvement for the solutions of (-)sf=0.
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