Grading of affine Weyl semi-groups of Kac-Moody type
Abstract
For any Kac-Moody root data D, D. Muthiah and D. Orr have defined a partial order on the semi-direct product W+ of the integral Tits cone with the vectorial Weyl group of D, and a strictly compatible Z-valued length function. We classify covers for this order and show that this length function defines a Z-grading of W+, generalizing the case of affine ADE root systems and giving a positive answer to a conjecture of Muthiah and Orr.
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