Eigenfunctions with double exponential rate of localization
Abstract
We construct a real-valued solution to the eigenvalue problem -div(A∇ u)=λ u, λ>0, in the cylinder T2× R with a real, uniformly elliptic, and uniformly C1 matrix A such that |u(x,y,t)|≤ C e-c ec|t| for some c,C>0. We also construct a complex-valued solution to the heat equation ut= u + B ∇ u in a half-cylinder with continuous and uniformly bounded B, which also decays with double exponential speed. Related classical ideas, used in the construction of counterexamples to the unique continuation by Plis and Miller, are reviewed.
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