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On the infiniteness of the discrete spectrum of the energy operator of a system of $n$ particles
M. A. Antonets, G. M. Zhislin, I. A. Shereshevskii
Abstract:
The Hamiltonian $H$ of a quantum system of $n$ particles is considered in spaces of functions that are transformed by multiple irreducible representations of a symmetry group of $H$, namely the direct product of the symmetric group by an arbitrary compact subgroup of the full rotation group. Sufficient conditions are found for the discrete spectrum of $H$ to be infinite.
The results obtained permit one in many cases to reduce this problem to that for an operator of a two-particle system.
Bibliography: 18 titles.
Received: 10.02.1975
Citation:
M. A. Antonets, G. M. Zhislin, I. A. Shereshevskii, “On the infiniteness of the discrete spectrum of the energy operator of a system of $n$ particles”, Math. USSR-Sb., 28:1 (1976), 27–39
Linking options:
https://www.mathnet.ru/eng/sm2704https://doi.org/10.1070/SM1976v028n01ABEH001638 https://www.mathnet.ru/eng/sm/v141/i1/p34
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