On the number of eigenvalues of a model operator associated to a system of three-particles on lattices
Sergio AlbeverioInstitut für Angewandte Mathematik, Universität Bonn, Wegelerstr. 6, D-53115, Bonn, GermanyS. N. LakaevSamarkand Division of Academy of Sciences of Uzbekistan, UzbekistanZahriddin MuminovSamarkand Division of Academy of Sciences of Uzbekistan, Uzbekistan
ABI
Аннотация
A model operator H associated to a system of three particles on the threedimensional lattice ℤ3 that interact via nonlocal pair potentials is studied. The following results are established. (i) The operator H has infinitely many eigenvalues lying below the bottom of the essential spectrum and accumulating at this point if both the Friedrichs model operators $$h_{\mu _\alpha } $$ (0), α = 1, 2, have threshold resonances. (ii) The operator H has finitely many eigenvalues lying outside the essential spectrum if at least one of the operators $$h_{\mu _\alpha } $$ (0), α = 1, 2, has a threshold eigenvalue.
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