Recurrence Relations for Cosets in Free Groups

Abstract

Let F2 be the free group on two generators and let H be a subgroup of F2. We investigate a method for calculating the number of elements in a coset of H that have a given length when written in reduced form. More specifically, taking Sn⊂eq F2 to be the set of elements of length n, we show that for any coset yH there always exists a recurrence relation of the form \[ |yH Sn| = Σi=1n-1ΣxH∈ F2/Hai,xH· |xH Sn-i| \] for some constants (ai,xH)i∈ N, xH∈ F2/H, and we give an algorithm that calculates these constants. Further, we show that when H has finite index and contains an element of odd length, only finitely many of the constants ai,xH are nonzero.

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