A note on H\"older regularity of weak solutions to linear elliptic equations

Abstract

In this paper, we show that weak solutions of -div A(x)∇ u = 0 where A(x)= A(x)T \,\, and \,\, λ |ζ|2 ≤ A(x)ζ,ζ ≤ |ζ|2, and A(x) A is a constant matrix are H\"older continuous u ∈ Cαloc with α ≥ 12 (-(n-2) + (n-2)2 + 4(n-1)λ ). This implies that the example constructed by Piccinini - Spagnolo is sharp in the class of constant matrices A(x) A. The proof of H\"older regularity does not go through a reduction of oscillation type argument and instead is achieved through a monotonicity formula. In the case of general matrices A(x), we obtain the same regularity under some additional hypothesis.

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