WDVV-like equations in N=2 SUSY Yang-Mills Theory
Abstract
The prepotential F(ai), defining the low-energy effective action of the SU(N) N=2 SUSY Yang-Mills theories, satisfies an enlarged set of the WDVV-like equations FiFk-1Fj = FjFk-1Fi for any triple i,j,k = 1,…,N-1, where matrix Fi is equal to (Fi)mn = ∂3 F/∂ ai∂ am∂ an. The same equations are actually true for generic topological theories. In contrast to the conventional formulation, when k is restricted to k=0, in the proposed system there is no distinguished ``first'' time-variable, and indices can be raised with the help of any ``metric'' ηmn(k) = (Fk)mn, not obligatory flat. All the equations (for all i,j,k) are true simultaneously. This result provides a new parallel between the Seiberg-Witten theory of low-energy gauge models in 4d and topological theories.
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