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Proceedings Paper

Numerical solving of the 2D-eigenvalue problem in a self-consistent basis
Author(s): S. I. Vinitsky; D. N. Pak; V. A. Rostovtsev; N. A. Chekanov; Yu. A. Ukolov
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Paper Abstract

An economy method of numerical solving the partial isospectral 2D boundary problem in self-consistent basis is elaborated. An efficiency of the method is shown for an integrable system described by a generalized Henon-Heiles Hamiltonian depended on two real-values parameters.

Paper Details

Date Published: 9 June 2005
PDF: 4 pages
Proc. SPIE 5773, Saratov Fall Meeting 2004: Laser Physics and Photonics, Spectroscopy, and Molecular Modeling V, (9 June 2005); doi: 10.1117/12.636967
Show Author Affiliations
S. I. Vinitsky, Joint Institute for Nuclear Research (Russia)
D. N. Pak, Belgorod State Univ. (Russia)
V. A. Rostovtsev, Joint Institute for Nuclear Research (Russia)
N. A. Chekanov, Belgorod State Univ. (Russia)
Yu. A. Ukolov, Belgorod State Univ. (Russia)


Published in SPIE Proceedings Vol. 5773:
Saratov Fall Meeting 2004: Laser Physics and Photonics, Spectroscopy, and Molecular Modeling V
Vladimir L. Derbov; Leonid A. Melnikov; Lev M. Babkov, Editor(s)

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