A note on involution prefixes in Coxeter groups
Abstract
Let (W, R) be a Coxeter system and let w ∈ W. We say that u is a prefix of w if there is a reduced expression for u that can be extended to one for w. That is, w = uv for some v in W such that (w) = (u) + (v). We say that w has the ancestor property if the set of prefixes of w contains a unique involution of maximal length. In this paper we show that all Coxeter elements of finitely generated Coxeter groups have the ancestor property, and hence a canonical expression as a product of involutions. We conjecture that the property in fact holds for all non-identity elements of finite Coxeter groups.
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