English

Monomiality principle, Sheffer-type polynomials and the normal ordering problem

Quantum Physics 2010-03-17 v2

Abstract

We solve the boson normal ordering problem for (q(a)a+v(a))n(q(a^\dag)a+v(a^\dag))^n with arbitrary functions q(x)q(x) and v(x)v(x) and integer nn, where aa and aa^\dag are boson annihilation and creation operators, satisfying [a,a]=1[a,a^\dag]=1. This consequently provides the solution for the exponential eλ(q(a)a+v(a))e^{\lambda(q(a^\dag)a+v(a^\dag))} generalizing the shift operator. In the course of these considerations we define and explore the monomiality principle and find its representations. We exploit the properties of Sheffer-type polynomials which constitute the inherent structure of this problem. In the end we give some examples illustrating the utility of the method and point out the relation to combinatorial structures.

Keywords

Cite

@article{arxiv.quant-ph/0510079,
  title  = {Monomiality principle, Sheffer-type polynomials and the normal ordering problem},
  author = {K A Penson and P Blasiak and G Dattoli and G H E Duchamp and A Horzela and A I Solomon},
  journal= {arXiv preprint arXiv:quant-ph/0510079},
  year   = {2010}
}

Comments

Presented at the 8'th International School of Theoretical Physics "Symmetry and Structural Properties of Condensed Matter " (SSPCM 2005), Myczkowce, Poland. 13 pages, 31 references