Unique continuation for a non bi-Laplacian fourth order elliptic operator

Abstract

This paper discusses the unique continuation principal of the solutions of the following perturbed fourth order elliptic differential operator LA,qu=0, where \[ LA,q(x,D)\ =\ Σj=1nD4xj + Σj=1n AjDxj + q, (A, q) ∈ W1,∞(,Cn) × L∞(,C) \] whose principal term is not given by some integer power of the Laplacian operator. We derive some suitable Carleman estimates which is the main tool to prove the unique continuation principle. As a by-product, we also deduce some stability estimate and prove the strong unique continuation principle in 2-dimension.