Sufficient conditions for the monotonicity of the undetected error probability for large channel error probabilities
Journal article, 2005

The performance of a linear error-detecting code in a symmetric memoryless channel is characterized by its probability of undetected error, which is a function of the channel symbol error probability, involving basic parameters of a code and its weight distribution. However, the code weight distribution is known for relatively few codes since its computation is an NP-hard problem. It should therefore be useful to have criteria for properness and goodness in error detection that do not involve the code weight distribution. In this work we give two such criteria. We show that a binary linear code C of length n and its dual code C ⊥ of minimum code distance d ⊥ are proper for error detection whenever d ⊥ ≥ ⌊n/2⌋ + 1, and that C is proper in the interval [(n + 1 − 2d ⊥)/(n − d ⊥); 1/2] whenever ⌈n/3⌉ + 1 ≤ d ⊥ ≤ ⌊n/2⌋. We also provide examples, mostly of Griesmer codes and their duals, that satisfy the above conditions.

linear code

interval propernes

error detection

proper code

Author

Rossitza Dodunekova

Chalmers, Mathematical Sciences

University of Gothenburg

Evgenia Nikolova

Problems of Information Transmission

Vol. 41 3 187-198

Subject Categories

Other Mathematics

More information

Created

10/8/2017