Dressing Method for The Schrodinger Eigenvalue Problem

川田 勉

doi:10.15099/00004453

書誌事項

タイトル別名

シュレディンガーコユウチモンダイノドレッシングホウエイブン
シュレデインガー固有値問題のドレッシング法

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説明

The Riemann-Hilbert problem (RHP) plays a key role on the invers scattering transform (IST), by which many types of nonlinear evolution equations (NLEE's) can be solved. The IST of Schrodinger cperator is reviewed in some content, that is, a vector formalism is given. Considerations of the reviews enabled us to derive the dressing method (originally developed by Zakharov and Shabat) which is also powerful to solve the NLEE's. Connections between both methods are made clear. We find that a Schrodinger problem results in the dressing method and the Gel'fand-Levitan type of integral equations (GLE) is also derived with the same spectral function as the one of the 1ST. This fact means to define the scattering data still for the dressing method.

収録刊行物

富山大学工学部紀要

富山大学工学部紀要 44 41-51, 1993-03

富山大学工学部

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詳細情報詳細情報について

CRID: 1390290699783676544

NII論文ID: 110000292882

NII書誌ID: AN00175872

ISSN: 03871339

DOI: 10.15099/00004453

HANDLE: 10110/10435

NDL書誌ID: 3804939

Web Site: https://toyama.repo.nii.ac.jp/records/4459; http://id.ndl.go.jp/bib/3804939; https://ndlsearch.ndl.go.jp/books/R000000004-I3804939

本文言語コード: en

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