K-stability of Thaddeus' moduli of stable bundle pairs on genus two curves
Abstract
The moduli space of bundle stable pairs MC(2,) on a smooth projective curve C, introduced by Thaddeus, is a smooth Fano variety of Picard rank two. Focusing on the genus two case, we show that its K-moduli space is isomorphic to a GIT moduli of lines in quartic del Pezzo threefolds. Additionally, we construct a natural forgetful morphism from the K-moduli of MC(2,) to that of the moduli spaces of stable vector bundles NC(2,). In particular, Thaddeus' moduli spaces for genus two curves are all K-stable.
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