IT is known that the average undetected error probability (UEP) of a binary [n, k] code Con a binary symmetric channel with crossover probability p is given byP<sub>e</sub>(p) = sum from i=1 A<sub&g...IT is known that the average undetected error probability (UEP) of a binary [n, k] code Con a binary symmetric channel with crossover probability p is given byP<sub>e</sub>(p) = sum from i=1 A<sub>i</sub>p<sup>i</sup>(1-p)<sup>n-1</sup>, (1)where (A<sub>0</sub>, A<sub>1</sub>,…, A<sub>n</sub>) is the weight distribution of C. If for all 0≤p≤0.5, P<sub>e</sub>(p)≤P<sub>e</sub>(0. 5) = 2<sup>k-n</sup>-2<sup>-n</sup>, then C is called good for error detection. Moreover, if P<sub>e</sub> (p) ismonotonously increasing in the interval [0, 0.5], then C is called proper. Clearly, propercodes are good.展开更多
The undetected error probability and error detection capability of shortened Hamming codes and their dual codes are studied in this paper. We also obtain some interesting properties for the shortened Simplex codes.
文摘IT is known that the average undetected error probability (UEP) of a binary [n, k] code Con a binary symmetric channel with crossover probability p is given byP<sub>e</sub>(p) = sum from i=1 A<sub>i</sub>p<sup>i</sup>(1-p)<sup>n-1</sup>, (1)where (A<sub>0</sub>, A<sub>1</sub>,…, A<sub>n</sub>) is the weight distribution of C. If for all 0≤p≤0.5, P<sub>e</sub>(p)≤P<sub>e</sub>(0. 5) = 2<sup>k-n</sup>-2<sup>-n</sup>, then C is called good for error detection. Moreover, if P<sub>e</sub> (p) ismonotonously increasing in the interval [0, 0.5], then C is called proper. Clearly, propercodes are good.
基金supported by the National Natural Science Foundation of China, No. 69802008.
文摘The undetected error probability and error detection capability of shortened Hamming codes and their dual codes are studied in this paper. We also obtain some interesting properties for the shortened Simplex codes.
