The length and thickness of words in a free group

Abstract: Abstract. In this paper we generalize the notion of a cut point of a graph. We assign to each graph a non-negative integer, called its thickness, so that a graph has thickness 0 if and only if it has a cut point. We then apply a method of J. H. C. Whitehead to show that if the coinitial graph of a given word has thickness t, then any word equivalent to it in a free group of rank n has length at least 2nt. We also define what it means for a word in a free group to be separable and we show that there is an algor… Show more

Stability of Numerical Invariants in Free Groups

Stability of Numerical Invariants in Free Groups

On a Method of J. H. C. Whitehead

A note on the fundamental groups and covers of lattice walk