Rational Weyl group elements of odd type D
Abstract
Voloshyn introduced rational Weyl group elements in connection with rational normal forms on complex reductive groups and conjectured that, in type with odd, their number is . We prove a stronger structural statement. For odd, the rational Weyl group elements in are exactly the longest element together with two explicitly described signed cyclic elements and for every non-empty subset . Consequently the rationality graph is two explicitly labelled Boolean-type halves glued at , its number of vertices is , and its only vertices of valency one are and . The proof combines an acyclic two-level description of the rationality graphs with a rigidity argument for all one-step rational descents from . The latter uses Voloshyn's descent lemma, while all type- exclusions are given by explicit loops or two-cycles in the root-poset rationality graph.
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Cite
@article{arxiv.2605.20928,
title = {Rational Weyl group elements of odd type D},
author = {Yutong Zhang and Yaoran Yang},
journal= {arXiv preprint arXiv:2605.20928},
year = {2026}
}