Optimal rates of decay at infinity for solutions to Schrödinger equations
Abstract
We prove rates of decay at infinity for solutions to variable-coefficient Schrödinger equations of the form -div(A ∇ u) + W · ∇ u + V u = λu in cylinders, Td × Rm. We assume that W and V are bounded and that λ∈ C. Our rates depend on the decay of |∇ A| at infinity. In particular, we prove a range of quantitative unique continuation-type results at infinity when |∇ A(θ, x)| C (1 + |x|)-τ for τ∈ [0,1]. By adapting the methods in [KLP25], we construct explicit solutions to demonstrate the sharpness of our estimates for each such τ.
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