Accurate WKB wave functions for weakly attractive inverse-square potentials

H. Friedrich, J. Trost

Research output: Contribution to journalArticlepeer-review

24 Scopus citations

Abstract

For a weakly attractive inverse-square potential, [Formula Presented] with [Formula Presented] the standard WKB wave function shows unphysical divergence near the origin. Introducing an appropriate nonvanishing reference point and a related phase yields WKB wave functions whose deviation from the regular solution of the Schrödinger equation decreases asymptotically as [Formula Presented] This is two orders better than the alternative technique involving the Langer modification of the potential. The performance of the correspondingly modified quantization conditions is demonstrated for the bound states of vanishing angular momentum in the two-dimensional circle billiard and in a two-dimensional Woods-Saxon well.

Original languageEnglish
Pages (from-to)1683-1686
Number of pages4
JournalPhysical Review A
Volume59
Issue number2
DOIs
StatePublished - 1999

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