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Bound states of a two-boson system on a two-dimensional lattice

Zh. I. AbdullaevFaculty of Mechanics and Mathematics, Alisher Navoi Samarkand State University, Samarkand, UzbekistanKomil KulievFaculty of Mechanics and Mathematics, Alisher Navoi Samarkand State University, Samarkand, Uzbekistan
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We consider a Hamiltonian of a two-boson system on a two-dimensional lattice Z2. The Schrödinger operator H(k 1, k 2) of the system for k 1 = k 2 = π, where k = (k 1, k 2) is the total quasimomentum, has an infinite number of eigenvalues. In the case of a special potential, one eigenvalue is simple, another one is double, and the other eigenvalues have multiplicity three. We prove that the double eigenvalue of H(π,π) splits into two nondegenerate eigenvalues of H(π, π − 2β) for small β > 0 and the eigenvalues of multiplicity three similarly split into three different nondegenerate eigenvalues. We obtain asymptotic formulas with the accuracy of β 2 and also an explicit form of the eigenfunctions of H(π, π −2β) for these eigenvalues.

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