On an almost-universal hash function family with applications to authentication and secrecy codes

TL;DR

This paper introduces a new variant of universal hash functions called GRDH, analyzes its universality properties based on number-theoretic conditions, and applies it to develop a generalized authentication code with secrecy.

Contribution

The paper defines GRDH, a variant of MMH$^*$, and characterizes its universality properties in terms of divisibility and gcd conditions, extending the application scope of universal hashing.

Findings

GRDH is $rac{1}{p-1}$-almost-$ riangle$-universal under certain conditions.

Universality of GRDH depends on $n$ being odd and gcd conditions on keys.

Application to a generalized authentication code with secrecy.

Abstract

Universal hashing, discovered by Carter and Wegman in 1979, has many important applications in computer science. MMH$^*$, which was shown to be $\Delta$-universal by Halevi and Krawczyk in 1997, is a well-known universal hash function family. We introduce a variant of MMH$^*$, that we call GRDH, where we use an arbitrary integer $n>1$ instead of prime $p$ and let the keys $\mathbf{x}=\langle x_1, \ldots, x_k \rangle \in \mathbb{Z}_n^k$ satisfy the conditions $\gcd(x_i,n)=t_i$ ($1\leq i\leq k$), where $t_1,\ldots,t_k$ are given positive divisors of $n$. Then via connecting the universal hashing problem to the number of solutions of restricted linear congruences, we prove that the family GRDH is an $\varepsilon$-almost-$\Delta$-universal family of hash functions for some $\varepsilon<1$ if and only if $n$ is odd and $\gcd(x_i,n)=t_i=1$ $(1\leq i\leq k)$. Furthermore, if these conditions are satisfied then GRDH is $\frac{1}{p-1}$-almost-$\Delta$-universal, where $p$ is the smallest prime divisor of $n$. Finally, as an application of our results, we propose an authentication code with secrecy scheme which strongly generalizes the scheme studied by Alomair et al. [{\it J. Math. Cryptol.} {\bf 4} (2010), 121--148], and [{\it J.UCS} {\bf 15} (2009), 2937--2956].