Near-Optimal Expanding Generating Sets for Solvable Permutation Groups

Abstract

Let G =<S> be a solvable permutation group of the symmetric group Sn given as input by the generating set S. We give a deterministic polynomial-time algorithm that computes an expanding generating set of size O(n2) for G. More precisely, the algorithm computes a subset T⊂ G of size O(n2)(1/λ)O(1) such that the undirected Cayley graph Cay(G,T) is a λ-spectral expander (the O notation suppresses O(1)n factors). As a byproduct of our proof, we get a new explicit construction of -bias spaces of size O(n( d))(1)O(1) for the groups dn. The earlier known size bound was O((d+n/2))11/2 given by AMN98.