Scattering and Thermodynamics of Integrable N=2 Theories
Abstract
We study N=2 supersymmetric integrable theories with spontaneously-broken \ symmetry. They have exact soliton masses given by the affine SU(n) Toda masses and fractional fermion numbers given by multiples of 1/n. The basic such N=2 integrable theory is the An-type N=2 minimal model perturbed by the most relevant operator. The soliton content and exact S-matrices are obtained using the Landau-Ginzburg description. We study the thermodynamics of these theories and calculate the ground-state energies exactly, verifying that they have the correct conformal limits. We conjecture that the soliton content and S-matrices in other integrable \ N=2 theories are given by the tensor product of the above basic N=2 \ scattering theory with various N=0 theories. In particular, we consider integrable perturbations of N=2 Kazama-Suzuki models described by generalized Chebyshev potentials, CPn-1 sigma models, and N=2 sine-Gordon and its affine Toda generalizations.
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