On tight bounds for binary frameproof codes (1406.6920v1)

Abstract: In this paper, we study $w$-frameproof codes, which are equivalent to ${1,w}$-separating hash families. Our main results concern binary codes, which are defined over an alphabet of two symbols. For all $w \geq 3$, and for $w+1 \leq N \leq 3w$, we show that an $SHF(N; n,2, {1,w })$ exists only if $n \leq N$, and an $SHF(N; N,2, {1,w })$ must be a permutation matrix of degree $N$.