Involution Products in Coxeter Groups
Abstract
For W a Coxeter group, let W = \ w ∈ W \;| \; w = xy \; where \; x, y ∈ W \; and \; x2 = 1 = y2 \. If W is finite, then it is well known that W = W. Suppose that w ∈ W. Then the minimum value of (x) + (y) - (w), where x, y ∈ W with w = xy and x2 = 1 = y2, is called the excess of w ( is the length function of W). The main result established here is that w is always W-conjugate to an element with excess equal to zero.
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