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Second virial coefficient from the scattering operator in quantum mechanics

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Abstract

A new expression is proposed for the second virial coefficient in quantum statistical mechanics in which there is no reference to the interaction potential, but only the S matrix appears. Then it is shown that our expression reproduces the well-known Beth-Uhlenbeck formula.
Authors:
Cognola, G; Soldati, R; Zerbini, S [1] 
  1. Libera Universita di Trento (Italy). Dept. di Matematica e Fisica
Publication Date:
Dec 17, 1977
DOI:
https://doi.org/10.1007/BF02799049
Product Type:
Journal Article
Reference Number:
AIX-14-762486; EDB-83-145089
Resource Relation:
Journal Name: Lett. Nuovo Cimento; (Italy); Journal Volume: 20:16
Subject:
71 CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS; VIRIAL EQUATION; QUANTUM OPERATORS; BOUND STATE; INTERACTION RANGE; PHASE SHIFT; PHASE SPACE; POTENTIAL SCATTERING; QUANTUM MECHANICS; S MATRIX; STATISTICAL MECHANICS; DISTANCE; ELASTIC SCATTERING; EQUATIONS; MATHEMATICAL OPERATORS; MATHEMATICAL SPACE; MATRICES; MECHANICS; SCATTERING; SPACE; 657002* - Theoretical & Mathematical Physics- Classical & Quantum Mechanics
OSTI ID:
5976711
Country of Origin:
Italy
Language:
English
Other Identifying Numbers:
Journal ID: CODEN: NCLTA
Submitting Site:
HEDB
Size:
Pages: 573-576
Announcement Date:
Jun 01, 1983

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Citation Formats

Cognola, G, Soldati, R, and Zerbini, S. Second virial coefficient from the scattering operator in quantum mechanics. Italy: N. p., 1977. Web. doi:10.1007/BF02799049.
Cognola, G, Soldati, R, & Zerbini, S. Second virial coefficient from the scattering operator in quantum mechanics. Italy. https://doi.org/10.1007/BF02799049
Cognola, G, Soldati, R, and Zerbini, S. 1977. "Second virial coefficient from the scattering operator in quantum mechanics." Italy. https://doi.org/10.1007/BF02799049.
@misc{etde_5976711,
title = {Second virial coefficient from the scattering operator in quantum mechanics}
 author = {Cognola, G, Soldati, R, and Zerbini, S}
 abstractNote = {A new expression is proposed for the second virial coefficient in quantum statistical mechanics in which there is no reference to the interaction potential, but only the S matrix appears. Then it is shown that our expression reproduces the well-known Beth-Uhlenbeck formula.}
 doi = {10.1007/BF02799049}
 journal = []
 volume = {20:16}
 journal type = {AC}
 place = {Italy}
 year = {1977}
 month = {Dec}
 }