A Meshkov-type construction for the borderline case

Abstract

We construct functions u: R2 C that satisfy an elliptic eigenvalue equation of the form - u + W · ∇ u + V u = λ u, where λ ∈ C, and V and W satisfy |V(x)| <x>-N, and |W(x)| <x>-P, with \N, P\ = 1/2. For |x| sufficiently large, these solutions satisfy |u(x)| (- c|x|). In the author's previous work, examples of solutions over R2 were constructed for all N, P such that \N,P\ ∈ [0, 1/2). These solutions were shown to have the optimal rate of decay at infinity. A recent result of Lin and Wang shows that the constructions presented in this note for the borderline case of \N, P\ = 1/2 also have the optimal rate of decay at infinity.