English

Finite-Difference Equations in Relativistic Quantum Mechanics

High Energy Physics - Theory 2009-10-28 v2

Abstract

Relativistic Quantum Mechanics suffers from structural problems which are traced back to the lack of a position operator x^\hat{x}, satisfying [x^,p^]=i1^[\hat{x},\hat{p}]=i\hbar\hat{1} with the ordinary momentum operator p^\hat{p}, in the basic symmetry group -- the Poincar\'e group. In this paper we provide a finite-dimensional extension of the Poincar\'e group containing only one more (in 1+1D) generator π^\hat{\pi}, satisfying the commutation relation [k^,π^]=i1^[\hat{k},\hat{\pi}]=i\hbar\hat{1} with the ordinary boost generator k^\hat{k}. The unitary irreducible representations are calculated and the carrier space proves to be the set of Shapiro's wave functions. The generalized equations of motion constitute a simple example of exactly solvable finite-difference set of equations associated with infinite-order polarization equations.

Keywords

Cite

@article{arxiv.hep-th/9410220,
  title  = {Finite-Difference Equations in Relativistic Quantum Mechanics},
  author = {V. Aldaya and J. Guerrero},
  journal= {arXiv preprint arXiv:hep-th/9410220},
  year   = {2009}
}

Comments

10 LaTeX pages, final version, enlarged (2 more pages)