On the number of commutation classes of the longest element in the symmetric group
Abstract
Using the standard Coxeter presentation for the symmetric group Sn, two reduced expressions for the same group element are said to be commutation equivalent if we can obtain one expression from the other by applying a finite sequence of commutations. The resulting equivalence classes of reduced expressions are called commutation classes. How many commutation classes are there for the longest element in Sn?
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