Title :
Cosets of convolutional codes with short maximum zero-run lengths
Author :
Hole, Kjell Jorgen
Author_Institution :
Dept. of Inf., Bergen Univ., Norway
fDate :
7/1/1995 12:00:00 AM
Abstract :
Communication systems and storage systems derive symbol synchronization from the received symbol stream. To facilitate symbol synchronization, the channel sequences must have a short maximum zero-run length. One way to achieve this is to use a coset of an (n, k) convolutional code to generate the channel inputs. For k⩽n-2, it is shown that there exist cosets with short maximum zero-run length for any constraint length. Any coset of an (n, n-1) code with high rate and/or large constraint length is shown to have a large maximum zero-run length. A systematic procedure for obtaining cosets with short maximum zero-run length from (n, k) codes is presented, and new cosets with short maximum zero-run length and large minimum Hamming distance are tabulated
Keywords :
binary sequences; convolutional codes; error correction codes; linear codes; matrix algebra; runlength codes; synchronisation; channel inputs; channel sequences; communication systems; constraint length; convolutional codes; cosets; encoding matrices; high rate code; large minimum Hamming distance; linear binary error control code; received symbol stream; short maximum zero-run lengths; storage systems; symbol synchronization; Block codes; Communication systems; Convolutional codes; Councils; Encoding; Error correction; Hamming distance; Informatics; Linear code; Shift registers;
Journal_Title :
Information Theory, IEEE Transactions on
