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Modified Anti Snyder Model with Minimal Length, Momentum Cutoff and Convergent Partition Function
- Authors
- Chung, Won Sang; Hassanabadi, Hassan
- Issue Date
- Jul-2019
- Publisher
- SPRINGER/PLENUM PUBLISHERS
- Keywords
- Modified anti Snyder model; Minimal length; Partition function; Cosmological Constant
- Citation
- INTERNATIONAL JOURNAL OF THEORETICAL PHYSICS, v.58, no.7, pp.2267 - 2281
- Indexed
- SCIE
SCOPUS
- Journal Title
- INTERNATIONAL JOURNAL OF THEORETICAL PHYSICS
- Volume
- 58
- Number
- 7
- Start Page
- 2267
- End Page
- 2281
- ISSN
- 0020-7748
- Abstract
- In this paper we consider the possible modification of the anti Snyder model so that it have the non-zero minimal length, momentum cutoff and the convergent partition function. For the modified anti Snyder model we discuss the representations, eigenstates of position operator, momentum wave function, one dimensional box problem, and harmonic oscillator problem. We extend this model into D-dimensional case so that it also may guarantee the convergent partition function. Using this partition function we discuss the thermodynamics of the free particle system and cosmological constant problem.
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