A Central Limit Theorem for Counting Functions Related to Symplectic Lattices and Bounded Sets

Abstract

We use a method developed by Bj\"orklund and Gorodnik to show a central limit theorem (as T tends to ∞) for the counting functions \# ( T ) where ranges over the space Y2d of symplectic lattices in R2d (d ≥slant 4). Here T T is a certain family of bounded domains in R2d that can be tessellated by means of the action of a diagonal semigroup contained in Sp(2d, R). In the process we obtain new Lp bounds on a certain height function on Y2d originally introduced by Schmidt.

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