English

Recurrence Relations for Cosets in Free Groups

Group Theory 2025-11-19 v1

Abstract

Let F2F_2 be the free group on two generators and let HH be a subgroup of F2F_2. We investigate a method for calculating the number of elements in a coset of HH that have a given length when written in reduced form. More specifically, taking SnF2S_n\subseteq F_2 to be the set of elements of length nn, we show that for any coset yHyH there always exists a recurrence relation of the form yHSn=i=1n1xHF2/Hai,xHxHSni |yH\cap S_n| = \sum_{i=1}^{n-1}\sum_{xH\in F_2/H}a_{i,xH}\cdot |xH\cap S_{n-i}| for some constants (ai,xH)iN,xHF2/H(a_{i,xH})_{i\in \mathbb{N}, xH\in F_2/H}, and we give an algorithm that calculates these constants. Further, we show that when HH has finite index and contains an element of odd length, only finitely many of the constants ai,xHa_{i,xH} are nonzero.

Cite

@article{arxiv.2511.14703,
  title  = {Recurrence Relations for Cosets in Free Groups},
  author = {Michael Reilly and Cory Shields},
  journal= {arXiv preprint arXiv:2511.14703},
  year   = {2025}
}

Comments

19 Pages

R2 v1 2026-07-01T07:43:48.202Z