The Monopole Equations in Topological Yang-Mills
Abstract
We twist the monopole equations of Seiberg and Witten and show how these equations are realized in topological Yang-Mills theory. A Floer derivative and a Morse functional are found and are used to construct a unitary transformation between the usual Floer cohomologies and those of the monopole equations. Furthermore, these equations are seen to reside in the vanishing self-dual curvature condition of an OSp(1|2)-bundle. Alternatively, they may be seen arising directly from a vanishing self-dual curvature condition on an SU(2)-bundle in which the fermions are realized as spanning the tangent space for a specific background.
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