Moduli spaces of instantons on toric noncommutative manifolds

We study analytic aspects of $U(n)$ gauge theory over a toric noncommutative manifold Mθ. We analyse moduli spaces of solutions to the self-dual Yang-Mills equations on $U(2)$ vector bundles over four-manifolds $M_\theta$, showing that each such moduli space is either empty or a smooth Hausdorff manifold whose dimension we explicitly compute. In the special case of the four-sphere $S^4_\theta$ we find that the moduli space of $U(2)$ instantons with fixed second Chern number $k$ is a smooth manifold of dimension $8k - 3$.

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Published 29 April 2014