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Volume 34, Issue 6, 1998, pp. 487–523
DOI: 10.2977/prims/1195144421

Published online: 1998-12-31

Resonances for a Semi-Classical Schrödinger Operator Near a Non Trapping Energy Level

Michel Rouleux[1]

(1) CNRS Luminy, Marseille, France

We give an example of a short range potential F on the real line that is dilation analytic at infinity, non trapping at energy E>0, but oscillating in the neighborhood of some points, so rapidly that the Schrödinger operator P=-h2Δ+V shows a string of resonances near E in the lower half plane when h>0 is small enough. The extended states behave as standing waves partially reflected off the bumps of V. Such a potential is the analogue of the Wigner-Von Neumann potential in the case of embedded eigenvalues.

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Rouleux Michel: Resonances for a Semi-Classical Schrödinger Operator Near a Non Trapping Energy Level. Publ. Res. Inst. Math. Sci. 34 (1998), 487-523. doi: 10.2977/prims/1195144421