Improved Constructions of Frameproof Codes

Abstract

Frameproof codes are used to preserve the security in the context of coalition when fingerprinting digital data. Let Mc,l(q) be the largest cardinality of a q-ary c-frameproof code of length l and Rc,l=q→ ∞Mc,l(q)/q l/c. It has been determined by Blackburn that Rc,l=1 when l 1\ (\ c), Rc,l=2 when c=2 and l is even, and R3,5=5/3. In this paper, we give a recursive construction for c-frameproof codes of length l with respect to the alphabet size q. As applications of this construction, we establish the existence results for q-ary c-frameproof codes of length c+2 and size c+2c(q-1)2+1 for all odd q when c=2 and for all q 46 when c=3. Furthermore, we show that Rc,c+2=(c+2)/c meeting the upper bound given by Blackburn, for all integers c such that c+1 is a prime power.