Semiclassical asymptotics of the Bloch--Torrey operator in two dimensions
Abstract
The Bloch--Torrey operator -h2+eiαx1 on a bounded smooth planar domain, subject to Dirichlet boundary conditions, is analyzed. Assuming α∈[0,3π5) and a non-degeneracy assumption on the left-hand side of the domain, asymptotics of the eigenvalues with the smallest real part in the limit h 0 are derived. The strategy is a backward complex scaling and the reduction to a tensorized operator involving a real Airy operator and a complex harmonic oscillator.
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