Boundary and Eisenstein Cohomology of SL3(Z)

Abstract

In this article, several cohomology spaces associated to the arithmetic groups SL3(Z) and GL3(Z) with coefficients in any highest weight representation Mλ have been computed, where λ denotes their highest weight. Consequently, we obtain detailed information of their Eisenstein cohomology with coefficients in Mλ. When Mλ is not self dual, the Eisenstein cohomology coincides with the cohomology of the underlying arithmetic group with coefficients in Mλ. In particular, for such a large class of representations we can explicitly describe the cohomology of these two arithmetic groups. We accomplish this by studying the cohomology of the boundary of the Borel-Serre compactification and their Euler characteristic with coefficients in Mλ. At the end, we employ our study to discuss the existence of ghost classes.