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For any finite-dimensional complex semisimple Lie algebra, two ellipsoids primary and secondary are considered. The equations of these ellipsoids are Diophantine equations, and the Weyl group acts on the sets of all their Diophantine solutions. This provides two realizations primary and secondary of the Weyl group on the sets of Diophantine solutions of the equations of the ellipsoids. The primary realization of the Weyl group suggests an order on the Weyl group, which is stronger than the Chevalley-Bruhat ordering of the Weyl group, and which provides an algorithm for the Chevalley-Bruhat ordering. The secondary realization of the Weyl group provides an algorithm for constructing all reduced expressions for any of its elements, and thus provides another way for the Chevalley-Bruhat ordering of the Weyl group.

KEYWORDS

Complex Semisimple Lie Algebra, Cartan Subalgebra, Weyl Group, Cartan Matrix, Primary and Secondary Ellipsoids, Diophantine Equations, Geometric Realizations, Coxeter Relations, Dynkin Diagram, Chevalley-Bruhat Ordering, Reduced Expressions

Cite this paper

Loutsiouk, A. 2016 On Ellipsoids Attached to Root Systems. Journal of Applied Mathematics and Physics, 4, 1513-1521. doi: 10.4236-jamp.2016.48160.





Author: Anatoli Loutsiouk

Source: http://www.scirp.org/



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