On a variant of Kazhdan's property (T) for subgroups of semisimple groups
Let be an irreducible lattice in a product of simple groups. Assume that has a factor with property (T). We give a description of the topology in a neighbourhood of the trivial one dimensional representation of in terms of the topology of the dual space of . We use this result to give a new proof for the triviality of the first cohomology group of with coefficients in a finite dimensional unitary representation.