Spectral Curves for Super-Yang-Mills with Adjoint Hypermultiplet for General Lie Algebras
Abstract
The Seiberg-Witten curves and differentials for =2 supersymmetric Yang-Mills theories with one hypermultiplet of mass m in the adjoint representation of the gauge algebra , are constructed for arbitrary classical or exceptional (except G2). The curves are obtained from the recently established Lax pairs with spectral parameter for the (twisted) elliptic Calogero-Moser integrable systems associated with the algebra . Curves and differentials are shown to have the proper group theoretic and complex analytic structure, and to behave as expected when m tends either to 0 or to ∞. By way of example, the prepotential for = Dn, evaluated with these techniques, is shown to agree with standard perturbative results. A renormalization group type equation relating the prepotential to the Calogero-Moser Hamiltonian is obtained for arbitrary , generalizing a previous result for = SU(N). Duality properties and decoupling to theories with other representations are briefly discussed.
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