English

Bargmann representations for deformed harmonic oscillators

q-alg 2016-09-08 v1 Quantum Algebra

Abstract

Generalizing the case of the usual harmonic oscillator, we look for Bargmann representations corresponding to deformed harmonic oscillators. Deformed harmonic oscillator algebras are generated by four operators a,a,Na, a^\dagger, N and the unity 1 such as [a,N]=a,[a,N]=a[a,N] = a, [a^\dagger,N] = -a^\dagger, aa=ψ(N)a^\dagger a = \psi(N) and aa=ψ(N+1)aa^\dagger =\psi(N+1). We discuss the conditions of existence of a scalar product expressed with a true integral on the space spanned by the eigenstates of aa (or aa^\dagger). We give various examples, in particular we consider functions ψ\psi that are linear combinations of qNq^N, qNq^{-N} and unity and that correspond to q-oscillators with Fock-representations or with non-Fock-representations.

Keywords

Cite

@article{arxiv.q-alg/9707020,
  title  = {Bargmann representations for deformed harmonic oscillators},
  author = {M. Irac-Astaud and G. Rideau},
  journal= {arXiv preprint arXiv:q-alg/9707020},
  year   = {2016}
}

Comments

23 pages, Latex