Separating hash families with large universe

Abstract

Separating hash families are useful combinatorial structures which generalize several well-studied objects in cryptography and coding theory. Let pt(N, q) denote the maximum size of universe for a t-perfect hash family of length N over an alphabet of size q. In this paper, we show that q2-o(1)<pt(t, q)=o(q2) for all t≥ 3, which answers an open problem about separating hash families raised by Blackburn et al. in 2008 for certain parameters. Previously, this result was known only for t=3, 4. Our proof is obtained by establishing the existence of a large set of integers avoiding nontrivial solutions to a set of correlated linear equations.

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