Codes with the Identifiable Parent Property for Multimedia Fingerprinting

Abstract

Let C be a q-ary code of length n and size M, and C(i) = \ c(i) \ | \ c=( c(1), c(2), …, c(n))T ∈ C\ be the set of ith coordinates of C. The descendant code of a sub-code C' ⊂eq C is defined to be C'(1) × C'(2) × ·s × C'(n). In this paper, we introduce a multimedia analogue of codes with the identifiable parent property (IPP), called multimedia IPP codes or t-MIPPC(n, M, q), so that given the descendant code of any sub-code C' of a multimedia t-IPP code C, one can always identify, as IPP codes do in the generic digital scenario, at least one codeword in C'. We first derive a general upper bound on the size M of a multimedia t-IPP code, and then investigate multimedia 3-IPP codes in more detail. We characterize a multimedia 3-IPP code of length 2 in terms of a bipartite graph and a generalized packing, respectively. By means of these combinatorial characterizations, we further derive a tight upper bound on the size of a multimedia 3-IPP code of length 2, and construct several infinite families of (asymptotically) optimal multimedia 3-IPP codes of length 2.