Graph isomorphisms in quasi-polynomial time

Abstract

Let us be given two graphs 1, 2 of n vertices. Are they isomorphic? If they are, the set of isomorphisms from 1 to 2 can be identified with a coset H·π inside the symmetric group on n elements. How do we find π and a set of generators of H? The challenge of giving an always efficient algorithm answering these questions remained open for a long time. Babai has recently shown how to solve these problems -- and others linked to them -- in quasi-polynomial time, i.e. in time (O( n)O(1)). His strategy is based in part on the algorithm by Luks (1980/82), who solved the case of graphs of bounded degree.