Symplectic structure on the character varieties of Sasakian threefolds
Abstract
Take a compact Sasakian threefold M and consider the associated irreducible SL(r, C)-character variety R := Hom(π1(M, x0), SL(r, C))ir/ SL(r, C) of M, where Hom(π1(M, x0), SL(r, C))ir is the space of irreducible homomorphisms. We first construct a natural algebraic 2-form on R. Then it is shown that this 2--form is closed. Finally we show that the restriction of this 2--form to Hom(π1(M, x0), SU(r))ir is symplectic.
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