The existence of bound states in a system of three particles in an optical lattice
Abstract
We consider the hamiltonian Hμ,μ∈ of a system of three-particles (two identical fermions and one different particle) moving on the lattice d ,\, d=1,2 interacting through repulsive (μ>0) or attractive (μ<0) zero-range pairwise potential μ V. We prove for any μ0 the existence of bound state of the discrete three-particle Schr\"odinger operator Hμ(K),\,K∈ d being the three-particle quasi-momentum, associated to the hamiltonian Hμ.
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