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Super Yang–Mills Theories
, 2000
"... Abstract: An algebraic proof of the nonrenormalization theorem for the perturbative beta function of the coupling constant of N = 2 Super Yang–Mills theory is provided. The proof relies on a fundamental relationship between the N = 2 Yang–Mills action and the local gauge invariant polynomial Tr φ 2, ..."
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Abstract: An algebraic proof of the nonrenormalization theorem for the perturbative beta function of the coupling constant of N = 2 Super Yang–Mills theory is provided. The proof relies on a fundamental relationship between the N = 2 Yang–Mills action and the local gauge invariant polynomial Tr φ 2
1 Super YangMills Theory on Lattice and the Transformation
, 2001
"... We present a new lattice super YangMills theory and its SUSY transformation. After our formulation of the model in a fundamental lattice, it is extended to the whole lattice with a substructure of modulo 2. 1. ..."
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We present a new lattice super YangMills theory and its SUSY transformation. After our formulation of the model in a fundamental lattice, it is extended to the whole lattice with a substructure of modulo 2. 1.
superYangMills theory
, 2002
"... A Calculation of the plane wave string Hamiltonian from N = 4 ..."
Covariant Harmonic Supergraphity for N = 2 Super YangMills Theories
 Proc. of Int. Seminar ”Supersymmetries and Quantum Symmetries
, 1977
"... Abstract. We review the background field method for general N = 2 super YangMills theories formulated in the N = 2 harmonic superspace. The covariant harmonic supergraph technique is then applied to rigorously prove the N = 2 nonrenormalization theorem as well as to compute the holomorphic lowene ..."
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Cited by 1 (1 self)
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Abstract. We review the background field method for general N = 2 super YangMills theories formulated in the N = 2 harmonic superspace. The covariant harmonic supergraph technique is then applied to rigorously prove the N = 2 nonrenormalization theorem as well as to compute the holomorphic low
Instanton Calculations for super YangMills Theory
, 2003
"... We study (anti) instantons in super YangMills theories defined on a non anticommutative superspace. The instanton solution that we consider is the same as in ordinary SU(2) N = 1 super YangMills, but the antiinstanton receives corrections to the U(1) part of the connection which depend quadratic ..."
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We study (anti) instantons in super YangMills theories defined on a non anticommutative superspace. The instanton solution that we consider is the same as in ordinary SU(2) N = 1 super YangMills, but the antiinstanton receives corrections to the U(1) part of the connection which depend
Yangians in Deformed Super YangMills Theories
, 802
"... We discuss the integrability structure of deformed, fourdimensional N = 4 super YangMills theories using Yangians. We employ a recent procedure by Beisert and Roiban that generalizes the beta deformation of Lunin and Maldacena to produce N = 1 superconformal gauge theories, which have the superalg ..."
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Cited by 2 (0 self)
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We discuss the integrability structure of deformed, fourdimensional N = 4 super YangMills theories using Yangians. We employ a recent procedure by Beisert and Roiban that generalizes the beta deformation of Lunin and Maldacena to produce N = 1 superconformal gauge theories, which have
1 Applications of the overlap formalism to super YangMills theories
, 1997
"... We show that the idea to use the overlap formalism to formulate 4D N = 1 super YangMills theory on the lattice without finetuning can be applied to 3DN = 1 case as well. Another application we propose is a regularization of the IIB matrix model, which is large N reduced model of 10DN = 1 super Yan ..."
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We show that the idea to use the overlap formalism to formulate 4D N = 1 super YangMills theory on the lattice without finetuning can be applied to 3DN = 1 case as well. Another application we propose is a regularization of the IIB matrix model, which is large N reduced model of 10DN = 1 super
5D super YangMills theory and the correspondence to
 AdS7/CFT6”, J. Phys. A: Math. theor
, 2013
"... We study the relation between 5D super YangMills theory and the holographic description of 6D (2, 0) superconformal theory. We start by clarifying some issues related to the localization of N = 1 SYM with matter on S5. We concentrate on the case of a single adjoint hypermultiplet with a mass term ..."
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Cited by 11 (1 self)
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We study the relation between 5D super YangMills theory and the holographic description of 6D (2, 0) superconformal theory. We start by clarifying some issues related to the localization of N = 1 SYM with matter on S5. We concentrate on the case of a single adjoint hypermultiplet with a mass term
Super YangMills Theory from a Supermatrix Model
, 2005
"... It is known that YangMills theory on noncommutative space can be derived from a large ˆ N reduced model. We apply it to the derivation of D = 4 N = 1 super YangMills theory in the superfield formalism. We can construct a supermatrix model such that this super YangMills theory can be derived fro ..."
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It is known that YangMills theory on noncommutative space can be derived from a large ˆ N reduced model. We apply it to the derivation of D = 4 N = 1 super YangMills theory in the superfield formalism. We can construct a supermatrix model such that this super YangMills theory can be derived
Results 1  10
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266,358