English

Measure Preserving Words are Primitive

Group Theory 2014-10-24 v3 Combinatorics Probability

Abstract

We establish new characterizations of primitive elements and free factors in free groups, which are based on the distributions they induce on finite groups. For every finite group GG, a word ww in the free group on kk generators induces a word map from GkG^k to GG. We say that ww is measure preserving with respect to GG if given uniform distribution on GkG^k, the image of this word map distributes uniformly on GG. It is easy to see that primitive words (words which belong to some basis of the free group) are measure preserving w.r.t. all finite groups, and several authors have conjectured that the two properties are, in fact, equivalent. Here we prove this conjecture. The main ingredients of the proof include random coverings of Stallings graphs, algebraic extensions of free groups, and M\"obius inversions. Our methods yield the stronger result that a subgroup of FkF_k is measure preserving if and only if it is a free factor. As an interesting corollary of this result we resolve a question on the profinite topology of free groups and show that the primitive elements of FkF_k form a closed set in this topology.

Keywords

Cite

@article{arxiv.1202.3269,
  title  = {Measure Preserving Words are Primitive},
  author = {Doron Puder and Ori Parzanchevski},
  journal= {arXiv preprint arXiv:1202.3269},
  year   = {2014}
}

Comments

37 pages, 6 figures. The new Prop. 1.6 determines which finite set of finite groups is needed to determine the primitivity of w

R2 v1 2026-06-21T20:19:41.585Z