English

Complex tridiagonal quantum Hamiltonians and matrix continued fractions

Mathematical Physics 2025-05-12 v2 math.MP Quantum Physics

Abstract

Quantum resonances described by non-Hermitian tridiagonal-matrix Hamiltonians HH with complex energy eigenvalues are considered. The method of evaluation of quantities σn\sigma_n known as the singular values of HH is proposed. Its basic idea is that the quantities σn\sigma_n can be treated as eigenvalues of an auxiliary self-adjoint operator H\mathbb{H}. As long as such an operator can be given a block-tridiagonal matrix form, we finally expand its resolvent in terms of a matrix continued fraction (MCF). In an illustrative application, a discrete version of conventional Hamiltonian H=d2/dx2+V(x)H=-d^2/dx^2+V(x) with complex local V(x)V(x)V(x) \neq V^*(x) is considered. The numerical MCF convergence is found quick, supported also by a fixed-point-based formal proof.

Keywords

Cite

@article{arxiv.2504.16424,
  title  = {Complex tridiagonal quantum Hamiltonians and matrix continued fractions},
  author = {Miloslav Znojil},
  journal= {arXiv preprint arXiv:2504.16424},
  year   = {2025}
}

Comments

15 pp

R2 v1 2026-06-28T23:08:05.524Z