Heisenberg Algebra in the Bargmann-Fock Space with Natural Cutoffs | Zendy

M. Roushan | Zendy; Kourosh Nozari | Zendy

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Heisenberg Algebra in the Bargmann-Fock Space with Natural Cutoffs

Author(s) -

M. Roushan,

Kourosh Nozari

Publication year - 2014

Publication title -

advances in high energy physics

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.59

H-Index - 49

eISSN - 1687-7365

pISSN - 1687-7357

DOI - 10.1155/2014/353192

Subject(s) - fock space , physics , space (punctuation) , momentum (technical analysis) , algebra over a field , mathematical physics , natural (archaeology) , construct (python library) , theoretical physics , position and momentum space , quantum mechanics , pure mathematics , mathematics , philosophy , computer science , linguistics , archaeology , history , finance , economics , programming language

We construct a Heisenberg algebra in Bargmann-Fock space in the presence of natural cutoffs encoded as minimal length, minimal momentum, and maximal momentum through a generalized uncertainty principle

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