On integral representation of thetranslation operator

Paulius Miškinis Info

Author Name	Affiliation
Paulius Miškinis	Facult y of Funda me nt al Sciences, Vilnius Gediminas Techni cal University Saulėtekio al. 11, LT- 10223 Vilnius, Lithuania

DOI: https://doi.org/10.3846/13926292.2012.645251

Abstract

The formulation in the explicit form of quantum expression of the one-dimensional translation operator as well as Hermitian operator of momentum and its eigenfunctions are presented. The interrelation between the momentum and the wave number has been generalized for the processes with a non-integer dimensionality α. The proof of the fractional representation of the translation operator is considered. Some aspects of the translations in graduate spaces and their integral representation, as well as applications in physics are discussed. The integral representation of the translation operator is proposed.

Keywords:

traslation operator, quantum mechanics, fractional calculus