Dense Packings from Algebraic Number Fields and Codes

Abstract

We introduce a new method from number fields and codes to construct dense packings in the Euclidean spaces. Via the canonical Q-embedding of arbitrary number field K into R[K:Q], both the prime ideal p and its residue field can be embedded as discrete subsets in R[K:Q]. Thus we can concatenate the embedding image of the Cartesian product of n copies of p together with the image of a length n code over . This concatenation leads to a packing in Euclidean space Rn[K:Q]. Moreover, we extend the single concatenation to multiple concatenation to obtain dense packings and asymptotically good packing families. For instance, with the help of , we construct one 256-dimension packing denser than the Barnes-Wall lattice BW256.