Von Neumann Dimensions and Trace Formulas I: Limit Multiplicities

Abstract

Given a connected semisimple Lie group G and an arithmetic subgroup , it is well-known that each irreducible representation π of G occurs in the discrete spectrum L2disc( G) of L2( G) with at most a finite multiplicity m(π). While m(π) is unknown in general, we are interested in its limit as is taken to be in a tower of lattices 1⊃ 2⊃…. For a bounded measurable subset X of the unitary dual G, we let m_n(X) be the sum of the multiplicity m_n(π) of a representation π over all π in X. Let HX be the direct integral of the irreducible representations in X, which is also a module over the group von Neumann algebra Ln. We prove: center n ∞m_n(X)LnHX=1, center for any bounded subset X of G, when i) n's are cocompact, or, ii) G=(n,R) and \n\ are principal congruence subgroups.