Speeding up Deciphering by Hypergraph Ordering

Abstract

The "Gluing Algorithm" of Semaev [Des.\ Codes Cryptogr.\ 49 (2008), 47--60] --- that finds all solutions of a sparse system of linear equations over the Galois field GF(q) --- has average running time O(mq 1kXj -k), where m is the total number of equations, and 1kXj is the set of all unknowns actively occurring in the first k equations. Our goal here is to minimize the exponent of q in the case where every equation contains at most three unknowns. %Applying hypergraph-theoretic methods we prove The main result states that if the total number 1mXj of unknowns is equal to m, then the best achievable exponent is between c1m and c2m for some positive constants c1 and c2.