Title :
On separability of some known nonlinear block codes
Author :
Sidorenko, Vladimir ; Martin, Ian ; Honary, Bahram
Author_Institution :
Inst. of Problems of Inf. Transmission, Acad. of Sci., Moscow, Russia
fDate :
29 Jun-4 Jul 1997
Abstract :
A code C is separable if it has a biproper trellis presentation. This trellis simultaneously minimizes the vertex count, the edge count, the cycle rank, and the overall Viterbi decoding complexity. All group codes (including linear codes) are separable. We investigate the separability of nonlinear codes. We give sufficient conditions for a code to be separable and show that some known nonlinear codes are separable. These include Hadamard, Levenshtein, Delsarte-Goethals, Kerdock, and Nordstrom-Robinson codes. All these codes remain separable after every symbol reordering. We show that a conference matrix code C 9 is not separable, but can be made separable by an appropriate permutation
Keywords :
Viterbi decoding; block codes; trellis codes; Delsarte-Goethals codes; Hadamard codes; Kerdock codes; Levenshtein codes; Nordstrom-Robinson codes; Viterbi decoding complexity; biproper trellis presentation; block codes; conference matrix code; cycle rank; edge count; group codes; nonlinear codes; permutation; separability; vertex count; Block codes; Decoding; Error correction; Error correction codes; Genetic mutations; Legged locomotion; Linear code; Sufficient conditions; Tail; Viterbi algorithm;
Conference_Titel :
Information Theory. 1997. Proceedings., 1997 IEEE International Symposium on
Conference_Location :
Ulm
Print_ISBN :
0-7803-3956-8
DOI :
10.1109/ISIT.1997.613443
