Generalized WDVV equations for F4 pure N=2 Super-Yang-Mills theory

L.K. Hoevenaars; P.H.M. Kersten; Ruud Martini

Generalized WDVV equations for F₄ pure N=2 Super-Yang-Mills theory

L.K. Hoevenaars, P.H.M. Kersten, Ruud Martini

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Abstract

An associative algebra of holomorphic differential forms is constructed associated with pure N=2 Super-Yang-Mills theory for the Lie algebra $F_4$ . Existence and associativity of this algebra, combined with the general arguments in the work of Marshakov, Mironov and Morozov, proves that the prepotential of this theory satisfies the generalized WDVV system.

Original language	Undefined
Place of Publication	Enschede
Publisher	University of Twente
Number of pages	16
ISBN (Print)	0169-2690
Publication status	Published - 2000

Publication series

Name	Memorandum / Faculty of Mathematical Sciences
Publisher	University of Twente, Department of Applied Mathematics
No.	1560
ISSN (Print)	0169-2690

Keywords

IR-65747
MSC-14H15
METIS-141311
EWI-3380
MSC-81T60

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Cite this

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title = "Generalized WDVV equations for F4 pure N=2 Super-Yang-Mills theory",

abstract = "An associative algebra of holomorphic differential forms is constructed associated with pure N=2 Super-Yang-Mills theory for the Lie algebra $F_4$ . Existence and associativity of this algebra, combined with the general arguments in the work of Marshakov, Mironov and Morozov, proves that the prepotential of this theory satisfies the generalized WDVV system.",

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AU - Hoevenaars, L.K.

AU - Kersten, P.H.M.

AU - Martini, Ruud

N1 - Imported from MEMORANDA

PY - 2000

Y1 - 2000

N2 - An associative algebra of holomorphic differential forms is constructed associated with pure N=2 Super-Yang-Mills theory for the Lie algebra $F_4$ . Existence and associativity of this algebra, combined with the general arguments in the work of Marshakov, Mironov and Morozov, proves that the prepotential of this theory satisfies the generalized WDVV system.

AB - An associative algebra of holomorphic differential forms is constructed associated with pure N=2 Super-Yang-Mills theory for the Lie algebra $F_4$ . Existence and associativity of this algebra, combined with the general arguments in the work of Marshakov, Mironov and Morozov, proves that the prepotential of this theory satisfies the generalized WDVV system.

KW - IR-65747

KW - MSC-14H15

KW - METIS-141311

KW - EWI-3380

KW - MSC-81T60

M3 - Report

SN - 0169-2690

T3 - Memorandum / Faculty of Mathematical Sciences

BT - Generalized WDVV equations for F4 pure N=2 Super-Yang-Mills theory

PB - University of Twente

CY - Enschede

ER -