The 2-torsion in the second homology of the genus 3 mapping class group

Abstract

This work is NOT to be used as reference. First, because as C.F.~B\"odigheimer and M.~Korkmaz pointed to us the computation of the Z2 factor that remained undecided in M.~Korkmaz and A. Stipsicz, The second homology groups of mapping class groups of orientable surfaces. Math. Proc. Camb. Phil. Soc., was shown to exist by Skasai, see hi Theorem 4.9 and Corollary 4.10 in Lagrangian mapping class groups from a group homological point of view. Algebr. Geom. Topol. 12 (2012), no. 1, 267--291. Second, because one could obtain this result by gathering old results in the literature, first by noticing as Korkmaz kindly reminded me, that D.~Johnson, in Homeomorphisms of a surface which act trivially on homology Porc. AMS Volume 75, Number 1, 1979. proved that the quotient of the Torelli group Tg/[Tg,Mg] is trivial for g≥ 3, the five term exact sequence then implies that the Z2 factor in Stein's computation of H2(Sp(6,Z);Z) = ZZ2 (see his The Schur Multipliers of Sp6(Z), Spin8(Z), Spin7(Z), and F4(Z). Math. Ann. 215 (1975), 173--193. ), detects the undecided Z2 factor in H2(M3;Z).