Representations of Generalized a$_r$ Statistics and Eigenstates of   Jacobson Generators

Mohammed Daoud

arXiv:math-ph/0606051·math-ph·November 11, 2009

Representations of Generalized a$_r$ Statistics and Eigenstates of Jacobson Generators

Mohammed Daoud

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TL;DR

This paper explores a generalized form of $A_r$ statistics, providing explicit state vectors, a functional Fock space description, and coherent states, while analyzing uncertainty relations.

Contribution

It introduces a comprehensive framework for $A_r$ statistics, including explicit state vectors, a Bargmann representation, and the construction of Gazeau-Klauder coherent states.

Findings

01

Explicit complete set of state vectors for $A_r$ statistics

02

Bargmann representation of the Fock space

03

Construction of Gazeau-Klauder coherent states

Abstract

We investigate a generalization of $A_{r}$ statistics discussed recently in the literature. The explicit complete set of state vectors for the $A_{r}$ statistics system is given. We consider a Bargmann or an analytic function description of the Fock space corresponding to $A_{r}$ statistics of bosonic kind. This brings, in a natural way, the so-called Gazeau-Klauder coherent states defined as eigenstates of the Jacobson annihilation operators. The minimization of Robertson uncertainty relation is also considered.

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