Symplectic resolutions of character varieties
Abstract
In this article we consider the connected component of the identity of G-character varieties of compact Riemann surfaces of genus g > 0, for connected complex reductive groups G of type A (e.g., SLn and GLn). We show that these varieties are symplectic singularities and classify which admit symplectic resolutions. The classification reduces to the semi-simple case, where we show that a resolution exists if and only if either g=1 and G is a product of special linear groups of any rank and copies of the group PGL2, or if g=2 and G = (SL2)m for some m.
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