Counting Co-Cyclic Lattices

Abstract

There is a well-known asymptotic formula, due to W. M. Schmidt (1968) for the number of full-rank integer lattices of index at most V in Zn. This set of lattices L can naturally be partitioned with respect to the factor group Zn/L. Accordingly, we count the number of full-rank integer lattices L ⊂eq Zn such that Zn/L is cyclic and of order at most V, and deduce that these co-cyclic lattices are dominant among all integer lattices: their natural density is (ζ(6) Πk=4n ζ(k))-1 ≈ 85\%. The problem is motivated by complexity theory, namely worst-case to average-case reductions for lattice problems.