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Teoreticheskaya i Matematicheskaya Fizika, 1973, Volume 15, Number 1, Pages 107–119
(Mi tmf3644)
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This article is cited in 20 scientific papers (total in 21 papers)
Projection operators for simple lie groups
R. M. Asherova, Yu. F. Smirnov, V. N. Tolstoy
Abstract:
The solution of many problems of nuclear theory reduces to projecting wave functions $\psi$ that are not eigenfunctions of the integrals of motion $\Lambda$ onto the eigenfunetion space of these
operators $\Lambda$. For this projection one requires projection operators for the groups $SU(n)$,
$SO(n)$, and other simple Lie groups. In the present paper a general scheme is proposed,
for an arbitrary simple Lie group $G(l)$ of rank $l$, for constructing raising and lowering operators
$\mathscr F_{+}$ and $\mathscr F_{-}$, which, together with the previously obtained operators $P^{[f]}$, form cornplete
projection operators for the given group. We are concerned with bases of irreducible
representations of $G(l)$ which are such that they correspond to restriction to a chain of regularly
imbedded subgroups $G(l)\supset G(g)\supset\dots\supset G(s)\supset\dots\supset G(t)$. As an example of a
concrete realization of the scheme the lowering operators $\mathscr F_{-}$ are obtained for the canonical
Gel'fand–Tseitlin basis for the group $U(n)$. The matrix elements of the generators of the
group $U(n)$ are obtained in this basis.
Received: 19.01.1972
Citation:
R. M. Asherova, Yu. F. Smirnov, V. N. Tolstoy, “Projection operators for simple lie groups”, TMF, 15:1 (1973), 107–119; Theoret. and Math. Phys., 15:1 (1973), 392–401
Linking options:
https://www.mathnet.ru/eng/tmf3644 https://www.mathnet.ru/eng/tmf/v15/i1/p107
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Abstract page: | 484 | Full-text PDF : | 197 | References: | 46 | First page: | 1 |
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