Quantitative unique continuation for Robin boundary value problems on C1,1 domains

Abstract

In this paper, we prove two unique continuation results for second order elliptic equations with Robin boundary conditions on C1,1 domains. The first one is a sharp vanishing order estimate of Robin problems with Lipschitz coefficients and differentiable, sign-changing potentials. This generalizes the result for the "Robin eigenfunctions" in [26], which deals with the case with constant potentials. The second result is a unique continuation result from the boundary -- any non-trivial solution cannot vanish at infinite order from the boundary or vanish on an open subset on the boundary. Such result generalizes the one in [1] for the Laplace equation on C1,1 domains with zero Neumann boundary conditions.