Localization of the eigenfunctions of a Bloch-Torrey operator on the half-plane

Abstract

We consider a non-self adjoint operator of the form -h2 + i(V(x) + α(x)y) on the upper half plane y > 0 with Dirichlet boundary conditions on \y = 0\ with V ≥ 0, V admitting a non-degenerate minimum at x = 0 and α'(0) = 0. We study its eigenfunctions associated to the smallest eigenvalues in magnitude in the semiclassical limit h 0. Elementary variational estimates show that these eigenfunctions are localized near the point (0,0) at the scales O(h1/3) in x and O(h2/3) in y. In this paper, we show that the O(h1/3) localization in x is not optimal; more precisely, we establish that the eigenfunctions are concentrated in a neighborhood of size O(h1/2) of the axis \x = 0\, and this scale is shown to be sharp. The proof relies on the symbolic calculus of operator-valued pseudodifferential operators.

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