Singleton-type bounds for blot-correcting codes

Consider the transmission of codewords over a channel which introduces dependent errors. Thinking of two-dimensional codewords, such errors can be viewed as blots of a particular shape on the codeword. For such blots of errors the combinatorial metric was introduced by Gabidulin (1971) and it was shown that a code with distance d in combinatorial metric can correct d/2 blots. We propose an universal Singleton-type upper bound on the rate R of a blot-correcting code with the distance d in arbitrary combinatorial metric. The rate is bounded by R/spl les/1-(d-1)/D, where D is the maximum possible distance between two words in this metric.

[1]  HIDEKI IMAI,et al.  Two-dimensional Fire codes , 1973, IEEE Trans. Inf. Theory.

[2]  Khaled A. S. Abdel-Ghaffar,et al.  Two-dimensional burst identification codes and their use in burst correction , 1988, IEEE Trans. Inf. Theory.

[3]  S. H. Reiger,et al.  Codes for the correction of 'clustered' errors , 1960, IRE Trans. Inf. Theory.

[4]  M. Blaum,et al.  Multiple burst-correcting array codes , 1988, IEEE Trans. Inf. Theory.

[5]  Vladimir Sidorenko Tilings of the plane and codes for translational combinatorial metrics , 1994, Proceedings of 1994 IEEE International Symposium on Information Theory.

[6]  Alexander Barg,et al.  At the Dawn of the Theory of Codes , 1993 .

[7]  Richard C. Singleton,et al.  Maximum distance q -nary codes , 1964, IEEE Trans. Inf. Theory.

[8]  William F. Friedman,et al.  Notes on Code Words , 1932 .