Title of article
A band factorization technique for transition matrix element asymptotics Original Research Article
Author/Authors
Emmanuel Perrey-Debain، نويسنده , , I. David Abrahams، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2006
Pages
8
From page
315
To page
322
Abstract
A new method of evaluating transition matrix elements between wave functions associated with orthogonal polynomials is proposed. The technique relies on purely algebraic manipulation of the associated recurrence coefficients. The form of the matrix elements is perfectly suited to very large quantum number calculations by using asymptotic series expansions. In practice, this allows the accurate and fast numerical treatment of transition matrix elements in the quasi-classical limit. Examples include the matrix elements of image in the harmonic oscillator basis, and connections with the Wigner 3j symbols.
Keywords
Transition matrix , Quasi-classical approximation , Orthogonal polynomial , Harmonic oscillator
Journal title
Computer Physics Communications
Serial Year
2006
Journal title
Computer Physics Communications
Record number
1137092
Link To Document