Bose-Hubbard models with on-site and nearest-neighbor interactions: Exactly solvable case

Abstract

We study the discrete spectrum of the two-particle Schr\"odinger operator Hμλ(K), K∈T2, associated to the Bose-Hubbard Hamiltonian Hμλ of a system of two identical bosons interacting on site and nearest-neighbor sites in the two dimensional lattice Z2 with interaction magnitudes μ∈R and λ∈R, respectively. We completely describe the spectrum of Hμλ(0) and establish the optimal lower bound for the number of eigenvalues of Hμλ(K) outside its essential spectrum for all values of K∈T2. Namely, we partition the (μ,λ)-plane such that in each connected component of the partition the number of bound states of Hμλ(K) below or above its essential spectrum cannot be less than the corresponding number of bound states of Hμλ(0) below or above its essential spectrum.

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