The Hilbert-Schmidt Theorem Formulation of the R-Matrix Theory

Abdurakhmanov A; Alexander L Zubarev; Babenko V A; Babenko V A; Barker F C; Barker F C; Barker F C; Berrington K A; Berrington K A; Blatt J M; Burke P G; Burke P G; Burke P G; Efimov V N; Feshbach H; Fu C Y; Kantorovich L V; Kapur P L; Kiernan L M; Knopp K; Kolmogorov A N; Lisini A; Nesbet R K; Schneider B I; Schneider B I; Sitenko A G; Szmytkowski R; Szmytkowski R; Szmytkowski R; Szmytkowski R; Vladimirov V S; Wigner E; Wigner E P; Yeong E Kim

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The Hilbert-Schmidt Theorem Formulation of the R-Matrix Theory

Authors: Abdurakhmanov A
Alexander L Zubarev
Babenko V A
Babenko V A
Barker F C
Barker F C
Barker F C
Berrington K A
Berrington K A
Blatt J M
Burke P G
Burke P G
Burke P G
Efimov V N
Feshbach H
Fu C Y
Kantorovich L V
Kapur P L
Kiernan L M
Knopp K
Kolmogorov A N
Lisini A
Nesbet R K
Schneider B I
Schneider B I
Sitenko A G
Szmytkowski R
Szmytkowski R
Szmytkowski R
Szmytkowski R
Vladimirov V S
Wigner E
Wigner E P
Yeong E Kim
Publication date: 1 January 1997
Publisher: 'IOP Publishing'
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Abstract

Using the Hilbert-Schmidt theorem, we reformulate the R-matrix theory in terms of a uniformly and absolutely convergent expansion. Term by term differentiation is possible with this expansion in the neighborhood of the surface. Methods for improving the convergence are discussed when the R-function series is truncated for practical applications.Comment: 16 pages, Late

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