Logarithmic finitesize corrections in the threedimensional mean spherical model
Abstract
The finitesize scaling prediction about logarithmic corrections in the free energy arising from corners in the geometry of the system is tested on the threedimensional mean spherical model. The general case of boundary conditions which are periodic in d[prime] [ge] 0 dimensions and free or fixed in the remaining 3  d[prime] dimensions is considered. Logarithmic and doublelogarithmic size corrections stemming from corners, edges, and surfaces are obtained. 15 refs.
 Authors:

 Institute of Mechanics and Biomechanics, Sofia (Bulgaria)
 Publication Date:
 OSTI Identifier:
 6076382
 Resource Type:
 Journal Article
 Journal Name:
 Journal of Statistical Physics; (United States)
 Additional Journal Information:
 Journal Volume: 71:34; Journal ID: ISSN 00224715
 Country of Publication:
 United States
 Language:
 English
 Subject:
 72 PHYSICS OF ELEMENTARY PARTICLES AND FIELDS; 71 CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS; NUCLEAR MODELS; BOUNDARY CONDITIONS; SPHERICAL MODEL; CORRECTIONS; FREE ENERGY; PHASE TRANSFORMATIONS; SCALING LAWS; STATISTICAL MECHANICS; ENERGY; MATHEMATICAL MODELS; MECHANICS; PHYSICAL PROPERTIES; THERMODYNAMIC PROPERTIES; 662100*  General Theory of Particles & Fields (1992); 661300  Other Aspects of Physical Science (1992)
Citation Formats
Brankov, J G, and Danchev, D M. Logarithmic finitesize corrections in the threedimensional mean spherical model. United States: N. p., 1993.
Web. doi:10.1007/BF01058447.
Brankov, J G, & Danchev, D M. Logarithmic finitesize corrections in the threedimensional mean spherical model. United States. https://doi.org/10.1007/BF01058447
Brankov, J G, and Danchev, D M. Sat .
"Logarithmic finitesize corrections in the threedimensional mean spherical model". United States. https://doi.org/10.1007/BF01058447.
@article{osti_6076382,
title = {Logarithmic finitesize corrections in the threedimensional mean spherical model},
author = {Brankov, J G and Danchev, D M},
abstractNote = {The finitesize scaling prediction about logarithmic corrections in the free energy arising from corners in the geometry of the system is tested on the threedimensional mean spherical model. The general case of boundary conditions which are periodic in d[prime] [ge] 0 dimensions and free or fixed in the remaining 3  d[prime] dimensions is considered. Logarithmic and doublelogarithmic size corrections stemming from corners, edges, and surfaces are obtained. 15 refs.},
doi = {10.1007/BF01058447},
url = {https://www.osti.gov/biblio/6076382},
journal = {Journal of Statistical Physics; (United States)},
issn = {00224715},
number = ,
volume = 71:34,
place = {United States},
year = {1993},
month = {5}
}
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