Word images in symmetric and classical groups of Lie type are dense

Abstract

Let w∈ Fk be a non-trivial word and denote by w(G)⊂eq G the image of the associated word map w Gk G. Let G be one of the finite groups Sn, GLn(q), Sp2m(q), GO2m(q), GO2m+1(q), GUn(q) (q a prime power, n≥ 2, m≥ 1), or the unitary group Un over C. Let dG be the normalized Hamming distance resp. the normalized rank metric on G when G is a symmetric group resp. one of the other classical groups and write n(G) for the permutation resp. Lie rank of G. For >0, we prove that there exists an integer N(,w) such that w(G) is -dense in G with respect to the metric dG if n(G)≥ N(,w). This confirms metric versions of a conjectures by Shalev and Larsen. Equivalently, we prove that any non-trivial word map is surjective on a metric ultraproduct of groups G from above such that n(G)∞ along the ultrafilter. As a consequence of our methods, we also obtain an alternative proof of the result of Hui-Larsen-Shalev that w1( SUn)w2( SUn)= SUn for non-trivial words w1,w2∈ Fk and n sufficiently large.