Stable Wild Vafa-Witten Bundles on the Projective Plane
Abstract
This work explores the geometry of stable wild Vafa-Witten bundles over the complex projective plane P2. Specifically, we consider stable rank-two pairs (E,), with E2 a rank-two holomorphic vector bundle and ∈ H0(P2,End0E(d)) for d≥0, and compute the dimension of the moduli space of such stable pairs. Moreover, we classify stable pairs (E,) when the underlying rank-two bundle E splits or is the push-forward of a line bundle on P1×P1. Lastly, we examine the fixed point locus of the natural C*-action on the moduli space.
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