2-Closure of 32-transitive group in polynomial time

Abstract

Let G be a permutation group on a finite set . The k-closure G(k) of the group G is the largest subgroup of Sym() having the same orbits as G on the k-th Cartesian power k of . A group G is called 32-transitive if its transitive and the orbits of a point stabilizer Gα on the set \α\ are of the same size greater than one. We prove that the 2-closure G(2) of a 32-transitive permutation group G can be found in polynomial time in size of . In addition, if the group G is not 2-transitive, then for every positive integer k its k-closure can be found within the same time. Applying the result, we prove the existence of a polynomial-time algorithm for solving the isomorphism problem for schurian 32-homogeneous coherent configurations, that is the configurations naturally associated with 32-transitive groups.