The Local Structure of the Cyclic Cohomology of Heisenberg Lie Groups

We give a closed formula for the cohomology groups of the standard integer lattice in the simply-connected Heisenberg Lie group of dimension 2 n q 1, n g Z q . We also provide a recursion relation involving n for these cohomology groups.

Given a continuous representation of a Lie group in a Banach space we study its l-cohomology. We prove that the computation of the l-cocycles can be reduced to that of the l-cocycles of the differential of the representation. When the group is semi-simple and the representation is K-finite, we prove

For each simply connected semisimple algebraic group G defined and split over the prime field ‫ކ‬ , we establish a uniform bound on n above which all of the first p Ž . cohomology groups with values in the simple modules for the finite group G n are Ž . determined by those for the algebraic group G