Hadamard Full Propelinear Codes of type Q. Rank and Kernel

Abstract

Hadamard full propelinear codes (HFP-codes) are introduced and their equivalence with Hadamard groups is proven (on the other hand, it is already known the equivalence of Hadamard groups with relative (4n,2,4n,2n)-difference sets in a group and also with cocyclic Hadamard matrices). We compute the available values for the rank and dimension of the kernel of HFP-codes of type Q and we show that the dimension of the kernel is always 1 or 2. We also show that when the dimension of the kernel is 2 then the dimension of the kernel of the transposed code is 1 (so, both codes are not equivalent). Finally, we give a construction method such that from an HFP-code of length 4n, dimension of the kernel k=2, and maximum rank r=2n, we obtain an HFP-code of double length 8n, dimension of the kernel k=2, and maximum rank r=4n.