The Landis Conjecture for variable coefficient second-order elliptic PDES

Abstract

In this work, we study the Landis conjecture for second-order elliptic equations in the plane. Precisely, assume that V 0 is a measurable real-valued function satisfying \|V\|L∞( R2) 1. Let u be a real solution to div(A ∇ u) - V u = 0 in R2. Assume that |u(z)| (c0 |z|) and u(0) = 1. Then, for any R sufficiently large, \[ ∈f|z0| = R \|u\|L∞(B1(z0)) (- C R R). \] In addition to equations with electric potentials, we also derive similar estimates for equations with magnetic potentials. The proofs rely on transforming the equations to Beltrami systems and Hadamard's three-quasi-circle theorem.