Constructions a of lattices from number fields and division algebras

Author

Vehkalahti, R. ; Kositwattanarerk, Wittawat ; Oggier, Frederique

Author_Institution

Dept. of Math. & Stat., Univ. of Turku, Turku, Finland

fYear

2014

fDate

June 29 2014-July 4 2014

Firstpage

2326

Lastpage

2330

Abstract

There is a rich theory of relations between lattices and linear codes over finite fields. However, this theory has been developed mostly with lattice codes for the Gaussian channel in mind. In particular, different versions of what is called Construction A have connected the Hamming distance of the linear code to the Euclidean structure of the lattice. This paper concentrates on developing a similar theory, but for fading channel coding instead. First, two versions of Construction A from number fields are given. These are then extended to division algebra lattices. Instead of the Euclidean distance, the Hamming distance of the finite codes is connected to the product distance of the resulting lattices, that is the minimum product distance and the minimum determinant respectively.

Keywords

Gaussian channels; Hamming codes; channel coding; determinants; fading channels; linear codes; Gaussian channel; Hamming distance; division algebra; fading channel coding; finite field; lattice Euclidean structure; lattice code; lattice construction A; linear code; number field; Fading; Lattices; Linear codes; Vectors;

fLanguage

English

Publisher

ieee

Conference_Titel

Information Theory (ISIT), 2014 IEEE International Symposium on

Conference_Location

Honolulu, HI

Type

conf

DOI

10.1109/ISIT.2014.6875249

Filename

6875249