Topology of moduli of parabolic connections with fixed determinant
Abstract
Let X be a compact Riemann surface of genus g ≥ 2 and D⊂ X be a fixed finite subset. Let be a line bundle of degree d over X. Let M(α, r, ) (respectively, Mconn(α, r, )) denote the moduli space of stable parabolic bundles (respectively, parabolic connections) of rank r (≥ 2), determinant and full flag generic rational parabolic weight type α. We show that πk(Mconn(α, r, )) πk(M(α, r, )) for k ≤2(r-1)(g-1)-1. As a consequence, we deduce that the moduli space Mconn(α, r, ) is simply connected. We also show that the Hodge structures on the torsion-free parts of both the cohomologies Hk(Mconn(α, r, ),Z) and Hk(M(α, r, ),Z) are isomorphic for all k≤ 2(r-1)(g-1)+1.
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