Asymptotics of Eigenvalues of the Two-particle Schrödinger operators on lattices

Abstract: The Hamiltonian of a system of two quantum mechanical particles moving on the $d$-dimensional lattice $\Z^d$ and interacting via zero-range attractive pair potentials is considered. For the two-particle energy operator $H_{\mu}(K),$ $K\in \T^d=(-\pi,\pi]^d$ -- the two-particle quasi-momentum, the existence of a unique positive eigenvalue $z(\mu, K)$ above the upper edge of the essential spectrum of $H_{\mu}(K)$ is proven and asymptotics for $z(\mu, K)$ are found when $\mu$ approaches to some $\mu_0(K)$ and $K\to 0.$