Title :
Multilevel construction of block and trellis group codes
Author :
Garello, Roberto ; Benedetto, Sergio
Author_Institution :
Dipartimento di Elettronica, Politecnico di Torino, Italy
fDate :
9/1/1995 12:00:00 AM
Abstract :
The theory of group codes has been shown to be a useful starting point for the construction of good geometrically uniform codes. In this paper we study the problem of building multilevel group codes, i.e., codes obtained combining separate coding at different levels in such a way that the resulting code is a group code. A construction leading to multilevel group codes for semi-direct and direct products is illustrated. The codes that can be obtained in this way are identified. New geometrically uniform Euclidean-space codes obtained from multilevel codes over abelian and nonabelian groups are presented
Keywords :
block codes; geometric codes; trellis codes; Euclidean-space codes; abelian groups; block codes; direct products; geometrically uniform codes; multilevel construction; nonabelian groups; semi-direct products; trellis group codes; Additives; Buildings; Convolutional codes; Decoding; Error probability; Euclidean distance; Gaussian channels; Information theory; Modulation coding; Phase shift keying;
Journal_Title :
Information Theory, IEEE Transactions on
