Open AccessMatrix Model, Kutasov Duality and Factorization of Seiberg-Witten Curves
Author(s) -
M. Klein
Publication year - 2003
Publication title -
journal of the korean physical society
Language(s) - English
Resource type - Reports
DOI - 10.2172/826452
Subject(s) - seiberg duality , factorization , superpotential , duality (order theory) , equivalence (formal languages) , mathematics , mathematical physics , gauge theory , matrix decomposition , pure mathematics , physics , supersymmetric gauge theory , supersymmetry , quantum mechanics , eigenvalues and eigenvectors , gauge anomaly , algorithm
We study the duality of N=1 gauge theories in the presence of a massless adjoint field. We calculate the superpotential using the factorization method and compare with the result obtained by applying Kutasov duality. The latter result is just the leading term of the former, indicating that Kutasov duality is exact only in the IR limit as claimed in the original literature. We also study various checks for the equivalence of the calculational methods developed recently: factorization methods, diagrammatic expansion, loop equations, integrating fluxes.
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