English

Word Measures on Unitary Groups

Group Theory 2016-02-02 v2 Geometric Topology

Abstract

We combine concepts from random matrix theory and free probability together with ideas from the theory of commutator length in groups and maps from surfaces, and establish new connections between the two. More particularly, we study measures induced by free words on the unitary groups U(n)U(n). Every word ww in the free group FrF_r on rr generators determines a word map from U(n)rU(n)^r to U(n)U(n), defined by substitutions. The ww-measure on U(n)U(n) is defined as the pushforward via this word map of the Haar measure on U(n)rU(n)^r. Let Trw(n)Tr_w(n) denote the expected trace of a random unitary matrix sampled from U(n)U(n) according to the ww-measure. It was shown by Voiculescu [Voic 91'] that for w1w \ne 1 this expected trace is o(n)o(n) asymptotically in nn. We relate the numbers Trw(n)Tr_w(n) to the theory of commutator length of words and obtain a much stronger statement: Trw(n)=O(n12g)Tr_w(n)=O(n^{1-2g}), where gg is the commutator length of ww. Moreover, we analyze the number limnn2g1Trw(n)\lim_{n\to\infty}n^{2g-1} \cdot Tr_w(n) and show it is an integer which, roughly, counts the number of (equivalence classes of) solutions to the equation [u1,v1]...[ug,vg]=w[u_1,v_1]...[u_g,v_g]=w with ui,viFru_i,v_i \in F_r. Similar results are obtained for finite sets of words and their commutator length, and we deduce that one can 'hear' the stable commutator length of a word by 'listening' to its unitary measures.

Keywords

Cite

@article{arxiv.1509.07374,
  title  = {Word Measures on Unitary Groups},
  author = {Michael Magee and Doron Puder},
  journal= {arXiv preprint arXiv:1509.07374},
  year   = {2016}
}

Comments

68 pages, 13 figures, results much more general than previous version (see Section 1.2)

R2 v1 2026-06-22T11:04:36.322Z