Fundamental groups of moduli stacks of stable curves of compact type
Abstract
Let Mg,n, for 2g-2+n>0, be the moduli stack of n-pointed, genus g, stable complex curves of compact type. Various characterizations and properties are obtained of both the algebraic and topological fundamental groups of the stack Mg,n. Let g,n, for 2g-2+n>0, be the Teichm\"uller group associated with a compact Riemann surface of genus g with n points removed Sg,n, i.e. the group of homotopy classes of diffeomorphisms of Sg,n which preserve the orientation of Sg,n and a given order of its punctures. Let Kg,n be the normal subgroup of g,n generated by Dehn twists along separating circles on Sg,n. As a first application of the above theory, a characterization of Kg,n is given for all n≥ 0 (for n=0,1, this was done by Johnson). Let then Tg,n be the Torelli group, i.e. the kernel of the natural representation g,n Sp2g(Z). The abelianization of Tg,n is determined for all g≥ 1 and n≥ 1, thus completing classical results by Johnson and Mess.
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