On transitive uniform partitions of Fn into binary Hamming codes

Abstract

We investigate transitive uniform partitions of the vector space Fn of dimension n over the Galois field GF(2) into cosets of Hamming codes. A partition Pn= \H0,H1+e1,…,Hn+en\ of Fn into cosets of Hamming codes H0,H1,…,Hn of length n is said to be uniform if the intersection of any two codes Hi and Hj, i,j∈ \0,1,…,n \ is constant, here ei is a binary vector in Fn of weight 1 with one in the ith coordinate position. For any n=2m-1, m>4 we found a class of nonequivalent 2-transitive uniform partitions of Fn into cosets of Hamming codes.