|
|||||
|
|
Class of majority-logic-decodable codes with a minimum distance of 4 |
|
| Authors: | Shiva SGS Buchholz A |
| Affiliation: | University of Ottawa, Department of Electrical Engineering, Ottawa, Canada; |
| Abstract: | We prove that the (n = 4a2 + 4a + l, k = 4a2) binary code generated by 1+X2a+X2a+1+X4a+1 has a minimum distance of 4 and is 1-step majority-Iogic-decodable. |
| Keywords: | |