The cohomology of the braid group B3 and of SL2(Z) with coefficients in a geometric representation
Abstract
The purpose of this article is to describe the integral cohomology of the braid group B3 and SL2(Z) with local coefficients in a classical geometric representation given by symmetric powers of the natural symplectic representation. These groups have a description in terms of the so called "divided polynomial algebra". The results show a strong relation between torsion part of the computed cohomology and fibrations related to loop spaces of spheres.
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