On solutions to a class of degenerate equations with the Grushin operator

Abstract

The Grushin Laplacian - α is a degenerate elliptic operator in Rh+k that degenerates on \0\ × Rk. We consider weak solutions of - α u= Vu in an open bounded connected domain with V ∈ W1,σ() and σ > Q/2, where Q = h + (1+α)k is the so-called homogeneous dimension of Rh+k. By means of an Almgren-type monotonicity formula we identify the exact asymptotic blow-up profile of solutions on degenerate points of . As an application we derive strong unique continuation properties for solutions.

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