English

Discrete Eigenvalues of a $2 \times 2$ Operator Matrix

Functional Analysis 2020-11-20 v1

Abstract

We consider a 2×22\times2 block operator matrix Aμ{\mathcal A}_\mu ((μ>0\mu>0 is a coupling constant)) acting in the direct sum of one- and two-particle subspaces of a bosonic Fock space. The location of the essential spectrum of Aμ{\mathcal A}_\mu is described and its bounds are estimated. It is shown that there exist the critical values μl0(γ)\mu_l^0(\gamma) with γ>0\gamma>0 and μr0(γ)\mu_r^0(\gamma) with γ<12\gamma<12 of the coupling constant μ>0\mu>0 such that for all γ>0\gamma>0 (γ<12)(\gamma<12) the operator Aμ{\mathcal A}_\mu with μ=μl0(γ)\mu=\mu_l^0(\gamma) (μ=μr0(γ)(\mu=\mu_r^0(\gamma) has infinitely many eigenvalues on the l.h.s. ((r.h.s.)) of the its essential spectrum. We prove that for all μ∉{μl0(γ),μr0(γ)}\mu \not\in \{\mu_l^0(\gamma),\mu_r^0(\gamma)\} the operator Aμ{\mathcal A}_\mu has finitely many discrete eigenvalues on the l.h.s. and r.h.s. of its essential spectrum.

Keywords

Cite

@article{arxiv.2011.09650,
  title  = {Discrete Eigenvalues of a $2 \times 2$ Operator Matrix},
  author = {Elyor B. Dilmurodov},
  journal= {arXiv preprint arXiv:2011.09650},
  year   = {2020}
}

Comments

16 pages

R2 v1 2026-06-23T20:21:44.718Z