On a mean value formula for multiple sums over a lattice and its dual
Abstract
We prove a generalized version of Rogers' mean value formula in the space Xn of unimodular lattices in Rn, which gives the mean value of a multiple sum over a lattice L and its dual L*. As an application, we prove that for L random with respect to the SL(n,R)-invariant probability measure, in the limit of large dimension n, the volumes determined by the lengths of the non-zero vectors x in L on the one hand, and the non-zero vectors x' in L* on the other hand, converge weakly to two independent Poisson processes on the positive real line, both with intensity 1/2.
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