Supersymmetric Soluble Systems Embedded in Supersymmetric Self--Dual Yang--Mills Theory
Abstract
We perform dimensional reductions of recently constructed self-dual ~N=2~ supersymmetric Yang-Mills theory in ~2+2\-dimensions into two-dimensions. We show that the universal equations obtained in these dimensional reductions can embed supersymmetric exactly soluble systems, such as ~N=1~ and ~N=2~ supersymmetric Korteweg-de Vries equations, ~N=1~ supersymmetric Liouville theory or supersymmetric Toda theory. This is the first supporting evidence for the conjecture that the ~2+2\-dimensional self-dual supersymmetric Yang-Mills theory generates supersymmetric soluble systems in lower-dimensions.
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