Nilpotency in instanton homology, and the framed instanton homology of a surface times a circle
Abstract
In the description of the instanton Floer homology of a surface times a circle due to Mu\~noz, we compute the nilpotency degree of the endomorphism u2-64. We then compute the framed instanton homology of a surface times a circle with non-trivial bundle, which is closely related to the kernel of u2-64. We discuss these results in the context of the moduli space of stable rank two holomorphic bundles with fixed odd determinant over a Riemann surface.
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