The number and location of eigenvalues for the two-particle Schrödinger operators on lattices
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Publication:6113156
DOI10.1007/S11785-023-01393-1arXiv2304.11610MaRDI QIDQ6113156
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Publication date: 8 August 2023
Published in: Complex Analysis and Operator Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2304.11610
Cites Work
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- The threshold effects for the two-particle Hamiltonians on lattices
- The number of bound states of a one-particle Hamiltonian on a three-dimensional lattice
- Some special properties of the generalized Friedrichs model
- On the bound state of Schrödinger operators in one dimension
- Coupling constant thresholds in nonrelativistic quantum mechanics. I. Short-range two-body case
- The Efimov effect of three-body Schrödinger operators
- The Efimov effect. Discrete spectrum asymptotics
- On Efimov's effect in a system of three identical quantum particles
- The cold atom Hubbard toolbox
- Schrödinger operators on lattices. The Efimov effect and discrete spectrum asymptotics
- Bound states of Schrödinger-type operators on one and two dimensional lattices
- Convergent expansions of eigenvalues of the generalized Friedrichs model with a rank-one perturbation
- On the spectrum of Schrödinger-type operators on two dimensional lattices
- On the discrete spectra of Schrödinger-type operators on one dimensional lattices
- Threshold effects in a two-fermion system on an optical lattice
- Asymptotic behavior of an eigenvalue of the two-particle discrete Schrödinger operator
- Perturbation of a lattice spectral band by a nearby resonance
- On the number of eigenvalues of a model operator related to a system of three particles on lattices
- Bounds on the discrete spectrum of lattice Schrödinger operators
- Threshold of discrete Schrödinger operators with delta potentials on n-dimensional lattice
- Asymptotic distribution of negative eigenvalues for three-body systems in two dimensions: Efimov effect in the antisymmetric space
- The Existence and location of eigenvalues of the one particle Hamiltonians on lattices
- Ultracold Atoms in Optical Lattices
- Bose–Hubbard models with on-site and nearest-neighbor interactions: exactly solvable case
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