Freely braided elements in Coxeter groups
Abstract
We introduce a notion of "freely braided element" for simply laced Coxeter groups. We show that an arbitrary group element w has at most 2N(w) commutation classes of reduced expressions, where N(w) is a certain statistic defined in terms of the positive roots made negative by w. This bound is achieved if w is freely braided. In the type A setting, we show that the bound is achieved only for freely braided w.
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