Strong unique continuation for variable coefficient parabolic operators with Hardy type potential

Abstract

In this paper, we prove the strong unique continuation property at the origin for solutions of the following scaling critical parabolic differential inequality \[ |div (A(x,t) ∇ u) - ut| ≤ M|x|2 |u|,\ \ \ \ \] where the coefficient matrix A is Lipschitz continuous in x and t. Our main result sharpens a previous one of Vessella concerned with the subcritical case as well as extends a recent result of one of us with Garofalo and Manna for the heat operator.