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Shibuya-Wulfman integral, evaluation

In (38), hi(uj) is an harmonic polynomial of order / in ui, U2 and M3, while hi sj) is the same harmonic polynomial with uj replaced by Sj. The Shibuya-Wulfman integrals can then be calculated by resolving the product of hyperspherical harmonics in (37) into terms of the form u hi(uj). To illustrate this second method for the evaluation of... [Pg.25]

Shibuya and Wulfman evaluated this integral for m = m = 0 for the first few values of the other quantum numbers using a method involving the coupling... [Pg.213]

Shibuya-Wulfman Integrals and Sturmian Overlap Integrals Evaluated... [Pg.54]

See other pages where Shibuya-Wulfman integral, evaluation is mentioned: [Pg.24]    [Pg.24]    [Pg.24]    [Pg.24]    [Pg.201]    [Pg.213]    [Pg.214]    [Pg.215]    [Pg.218]    [Pg.81]    [Pg.24]    [Pg.24]    [Pg.79]   
See also in sourсe #XX -- [ Pg.213 , Pg.214 , Pg.215 , Pg.216 ]



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Integral evaluation

Shibuya

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