Sharp constructions of eigenfunctions of the magnetic Schr\"odinger operator

Abstract

We prove sharpness of quantitative unique continuation results for solutions of - u + W· ∇ u + V u = u, where ∈ and V and W are complex-valued decaying potentials that satisfy |V(x)| <x>-N and |W(x)| <x>-P. For M(R) = ∈f|x0| = R||u||L2(B1(x0)), it was shown in a companion paper that if the solution u is non-zero, bounded, and u(0) = 1, then M(R) (-C R0( R)A(R)), where 0 = max2 - 2P, (4-2N)/3, 1. Under certain conditions on N, P, , and the dimension, we construct examples (some of which are in the style of Meshkov) to prove that this estimate for M(R) is sharp. That is, we construct functions u, V and W such that - u + W· ∇ u + V u = u, |V(x)| <x>-N, |W(x)| <x>-P and |u(x)| (-c|x|0( |x|)C).