skip to main content
OSTI.GOV title logo U.S. Department of Energy
Office of Scientific and Technical Information

Title: Restricted Schur polynomials and finite N counting

Abstract

Restricted Schur polynomials have been posited as orthonormal operators for the change of basis from N=4 SYM to type IIB string theory. In this paper we briefly expound the relationship between the restricted Schur polynomials and the operators forwarded by Brown, Heslop, and Ramgoolam. We then briefly examine the finite N counting of the restricted Schur polynomials.

Authors:
 [1]
  1. National Institute for Theoretical Physics, Department of Physics and Centre for Theoretical Physics, University of the Witwatersrand, Wits, 2050 (South Africa)
Publication Date:
OSTI Identifier:
21259851
Resource Type:
Journal Article
Journal Name:
Physical Review. D, Particles Fields
Additional Journal Information:
Journal Volume: 79; Journal Issue: 2; Other Information: DOI: 10.1103/PhysRevD.79.026002; (c) 2009 The American Physical Society; Country of input: International Atomic Energy Agency (IAEA); Journal ID: ISSN 0556-2821
Country of Publication:
United States
Language:
English
Subject:
72 PHYSICS OF ELEMENTARY PARTICLES AND FIELDS; MANY-DIMENSIONAL CALCULATIONS; MATHEMATICAL OPERATORS; POLYNOMIALS; STRING MODELS; SYMMETRY

Citation Formats

Collins, Storm. Restricted Schur polynomials and finite N counting. United States: N. p., 2009. Web. doi:10.1103/PHYSREVD.79.026002.
Collins, Storm. Restricted Schur polynomials and finite N counting. United States. https://doi.org/10.1103/PHYSREVD.79.026002
Collins, Storm. 2009. "Restricted Schur polynomials and finite N counting". United States. https://doi.org/10.1103/PHYSREVD.79.026002.
@article{osti_21259851,
title = {Restricted Schur polynomials and finite N counting},
author = {Collins, Storm},
abstractNote = {Restricted Schur polynomials have been posited as orthonormal operators for the change of basis from N=4 SYM to type IIB string theory. In this paper we briefly expound the relationship between the restricted Schur polynomials and the operators forwarded by Brown, Heslop, and Ramgoolam. We then briefly examine the finite N counting of the restricted Schur polynomials.},
doi = {10.1103/PHYSREVD.79.026002},
url = {https://www.osti.gov/biblio/21259851}, journal = {Physical Review. D, Particles Fields},
issn = {0556-2821},
number = 2,
volume = 79,
place = {United States},
year = {Thu Jan 15 00:00:00 EST 2009},
month = {Thu Jan 15 00:00:00 EST 2009}
}