Cohomology of symplectic groups and Meyer's signature theorem

Abstract

Meyer showed that the signature of a closed oriented surface bundle over a surface is a multiple of 4, and can be computed using an element of H2(Sp(2g, Z),Z). Denoting by 1 Z Sp(2g,Z) Sp(2g,Z) 1 the pullback of the universal cover of Sp(2g,R), Deligne proved that every finite index subgroup of Sp(2g, Z) contains 2Z. As a consequence, a class in the second cohomology of any finite quotient of Sp(2g, Z) can at most enable us to compute the signature of a surface bundle modulo 8. We show that this is in fact possible and investigate the smallest quotient of Sp(2g, Z) that contains this information. This quotient H is a non-split extension of Sp(2g,2) by an elementary abelian group of order 22g+1. There is a central extension 1 Z/2HH 1, and H appears as a quotient of the metaplectic double cover Mp(2g,Z)=Sp(2g,Z)/2Z. It is an extension of Sp(2g,2) by an almost extraspecial group of order 22g+2, and has a faithful irreducible complex representation of dimension 2g. Provided g 4, H is the universal central extension of H. Putting all this together, we provide a recipe for computing the signature modulo 8, and indicate some consequences.