Litcius/Paper detail

Conditions for the Existence of Eigenvalues of a Three-Particle Lattice Model Hamiltonian

Bekzod I. Bahronov, Tulkin H. Rasulov, Mubashar Rehman

2023Russian Mathematics14 citationsDOI

Abstract

In this article, we present a three-particle lattice model Hamiltonian $${{H}_{{\mu ,\lambda }}}$$ , $$\mu ,\lambda > 0$$ by making use nonlocal potential. The Hamiltonian under consideration acts as a tensor sum of two Friedrichs models $${{h}_{{\mu ,\lambda }}}$$ which comprises a rank 2 perturbation associated with a system of three quantum particles on a d-dimensional lattice. The current study investigates the number of eigenvalues associated with the Hamiltonian. Furthermore, we provide the suitable conditions on the existence of eigenvalues localized inside, in the gap and below the bottom of the essential spectrum of $${{H}_{{\mu ,\lambda }}}$$ .

Topics & Concepts

LambdaHamiltonian (control theory)Eigenvalues and eigenvectorsMathematicsLattice (music)Mathematical physicsPerturbation (astronomy)Essential spectrumQuantum mechanicsPhysicsMathematical optimizationAcousticsSpectral Theory in Mathematical PhysicsQuantum Mechanics and Non-Hermitian PhysicsQuantum chaos and dynamical systems
Conditions for the Existence of Eigenvalues of a Three-Particle Lattice Model Hamiltonian | Litcius