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Divergences in the moduli space integral and accumulating handles in the infinite-genus limit

Technical Report:

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Abstract

The symmetries associated with the bosonic string partition function integral are examined so that the integration region in Teichmuller space can be determined. The translation of the conditions on the period matrix defining the fundamental region can be translated to relations on the parameters of the uniformising Schottky group. The growth of the lower bound for the regularized partition function is derived through integration over a subset of the fundamental region. (author). 20 refs.
Authors:
Publication Date:
Dec 01, 1992
Product Type:
Technical Report
Report Number:
IC-92/431
Reference Number:
SCA: 662110; PA: AIX-24:030958; SN: 93000956173
Resource Relation:
Other Information: PBD: Dec 1992
Subject:
72 PHYSICS OF ELEMENTARY PARTICLES AND FIELDS; STRING MODELS; PARTITION FUNCTIONS; INFRARED DIVERGENCES; MATHEMATICAL SPACE; SYMMETRY; 662110; THEORY OF FIELDS AND STRINGS
OSTI ID:
10132368
Research Organizations:
International Centre for Theoretical Physics (ICTP), Trieste (Italy)
Country of Origin:
IAEA
Language:
English
Other Identifying Numbers:
Other: ON: DE93619722; TRN: XA9333564030958
Availability:
OSTI; NTIS (US Sales Only); INIS
Submitting Site:
INIS
Size:
[22] p.
Announcement Date:
Jul 04, 2005

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Citation Formats

Davis, S. Divergences in the moduli space integral and accumulating handles in the infinite-genus limit. IAEA: N. p., 1992. Web.
Davis, S. Divergences in the moduli space integral and accumulating handles in the infinite-genus limit. IAEA.
Davis, S. 1992. "Divergences in the moduli space integral and accumulating handles in the infinite-genus limit." IAEA.
@misc{etde_10132368,
title = {Divergences in the moduli space integral and accumulating handles in the infinite-genus limit}
 author = {Davis, S}
 abstractNote = {The symmetries associated with the bosonic string partition function integral are examined so that the integration region in Teichmuller space can be determined. The translation of the conditions on the period matrix defining the fundamental region can be translated to relations on the parameters of the uniformising Schottky group. The growth of the lower bound for the regularized partition function is derived through integration over a subset of the fundamental region. (author). 20 refs.}
 place = {IAEA}
 year = {1992}
 month = {Dec}
 }