Fake R4's, Einstein Spaces and Seiberg-Witten Monopole Equations
Abstract
We discuss the possible relevance of some recent mathematical results and techniques on four-manifolds to physics. We first suggest that the existence of uncountably many R4's with non-equivalent smooth structures, a mathematical phenomenon unique to four dimensions, may be responsible for the observed four-dimensionality of spacetime. We then point out the remarkable fact that self-dual gauge fields and Weyl spinors can live on a manifold of Euclidean signature without affecting the metric. As a specific example, we consider solutions of the Seiberg-Witten Monopole Equations in which the U(1) fields are covariantly constant, the monopole Weyl spinor has only a single constant component, and the 4-manifold M4 is a product of two Riemann surfaces Sigmap1 and Sigmap2. There are p1-1(p2-1) magnetic(electric) vortices on p1(p2), with p1 + p2 ≥ 2 (p1=p2= 1 being excluded). When the two genuses are equal, the electromagnetic fields are self-dual and one obtains the Einstein space p x p, the monopole condensate serving as the cosmological constant.
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