Zero Excess and Minimal Length in Finite Coxeter Groups
Abstract
Let W be the set of strongly real elements of W, a Coxeter group. Then for w ∈ W, e(w), the excess of w, is defined by e(w) = \(x) + (y) - (w) \; | \; w=xy, x2 = y2 = 1\. When W is finite we may also define E(w), the reflection excess of w. The main result established here is that if W is finite and X is a W-conjugacy class, then there exists w ∈ X such that w has minimal length in X and e(w) = 0 = E(w).
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