Improvement on Asymptotic Density of Packing Families Derived from Multiplicative Lattices

Abstract

Let ω=(-1+-3)/2. For any lattice P⊂eq Zn, P=P+ω P is a subgroup of OKn, where OK=Z[ω]⊂eq C. As C is naturally isomorphic to R2, P can be regarded as a lattice in R2n. Let P be a multiplicative lattice (principal lattice or congruence lattice) introduced by Rosenbloom and Tsfasman. We concatenate a family of special codes with tP·(P+ω P), where tP is the generator of a prime ideal P of OK. Applying this concatenation to a family of principal lattices, we obtain a new family with asymptotic density exponent λ≥slant-1.26532182283, which is better than -1.87 given by Rosenbloom and Tsfasman considering only principal lattice families. For a new family based on congruence lattices, the result is λ≥slant -1.26532181404, which is better than -1.39 by considering only congruence lattice families.