Title :
Combinatorial analysis of the minimum distance of turbo codes
Author :
Breiling, Marco ; Huber, Johannes B.
Author_Institution :
Lehrstuhl fur Nachrichtentech. II., Erlangen-Nurnberg Univ., Germany
fDate :
11/1/2001 12:00:00 AM
Abstract :
In this paper, new upper bounds on the maximum attainable minimum Hamming distance of turbo codes with arbitrary-including the best-interleavers are established using a combinatorial approach. These upper bounds depend on the interleaver length, the code rate, and the scramblers employed in the encoder. Examples of the new bounds for particular turbo codes are given and discussed. The new bounds are tighter than all existing ones and prove that the minimum Hamming distance of turbo codes cannot asymptotically grow at a rate more than the third root of the codeword length
Keywords :
combinatorial mathematics; concatenated codes; convolutional codes; interleaved codes; turbo codes; channel codes; code rate; codeword length; combinatorial analysis; encoder; interleaver length; minimum Hamming distance; parallel concatenated convolutional codes; scramblers; turbo codes; upper bounds; Bit error rate; Decoding; Hamming distance; Information theory; Parity check codes; Signal to noise ratio; Turbo codes; Upper bound;
Journal_Title :
Information Theory, IEEE Transactions on
