Bounds and Constructions for 3-Separable Codes with Length 3

Abstract

Separable codes were introduced to provide protection against illegal redistribution of copyrighted multimedia material. Let C be a code of length n over an alphabet of q letters. The descendant code desc(C0) of C0 = \ c1, c2, …, ct\ ⊂eq C is defined to be the set of words x = (x1, x2, …,xn)T such that xi ∈ \c1,i, c2,i, …, ct,i\ for all i=1, …, n, where cj=(cj,1,cj,2,…,cj,n)T. C is a t-separable code if for any two distinct C1, C2 ⊂eq C with |C1| t, |C2| t, we always have desc(C1) ≠ desc(C2). Let M(t,n,q) denote the maximal possible size of such a separable code. In this paper, an upper bound on M(3,3,q) is derived by considering an optimization problem related to a partial Latin square, and then two constructions for 3-SC(3,M,q)s are provided by means of perfect hash families and Steiner triple systems.