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3D-Ising model as a string theory in three-dimensional euclidean space

Technical Report:

Abstract

A three-dimensional string model is analyzed in the strong coupling regime. The contribution of surfaces with different topology to the partition function is essential. A set of corresponding models is discovered. Their critical indices, which depend on two integers (m,n) are calculated analytically. The critical indices of the three-dimensional Ising model should belong to this set. A possible connection with the chain of three dimensional lattice Pott`s models is pointed out. (author) 22 refs.; 2 figs.
Authors:
Publication Date:
Nov 01, 1992
Product Type:
Technical Report
Report Number:
LAPP-A-410-92
Reference Number:
SCA: 662110; PA: AIX-25:003975; EDB-94:015642; ERA-19:005598; NTS-94:014777; SN: 93001121017
Resource Relation:
Other Information: PBD: Nov 1992
Subject:
72 PHYSICS OF ELEMENTARY PARTICLES AND FIELDS; ISING MODEL; THREE-DIMENSIONAL CALCULATIONS; STRING MODELS; COUPLING; EUCLIDEAN SPACE; PARTITION FUNCTIONS; 662110; THEORY OF FIELDS AND STRINGS
OSTI ID:
10109832
Research Organizations:
Grenoble-1 Univ., 74 - Annecy (France). Lab. de Physique des Particules Elementaires
Country of Origin:
France
Language:
English
Other Identifying Numbers:
Other: ON: DE94609606; TRN: FR9303132003975
Availability:
OSTI; NTIS (US Sales Only); INIS
Submitting Site:
FRN
Size:
12 p.
Announcement Date:
Jun 30, 2005

Technical Report:

Citation Formats

Sedrakyan, A. 3D-Ising model as a string theory in three-dimensional euclidean space. France: N. p., 1992. Web.
Sedrakyan, A. 3D-Ising model as a string theory in three-dimensional euclidean space. France.
Sedrakyan, A. 1992. "3D-Ising model as a string theory in three-dimensional euclidean space." France.
@misc{etde_10109832,
title = {3D-Ising model as a string theory in three-dimensional euclidean space}
author = {Sedrakyan, A}
abstractNote = {A three-dimensional string model is analyzed in the strong coupling regime. The contribution of surfaces with different topology to the partition function is essential. A set of corresponding models is discovered. Their critical indices, which depend on two integers (m,n) are calculated analytically. The critical indices of the three-dimensional Ising model should belong to this set. A possible connection with the chain of three dimensional lattice Pott`s models is pointed out. (author) 22 refs.; 2 figs.}
place = {France}
year = {1992}
month = {Nov}
}