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Symplectic geometry on symplectic knot spaces.

Lee, Jae-Hyouk — 2007

The New York Journal of Mathematics [electronic only]

Polytopes, quasi-minuscule representations and rational surfaces

Jae-Hyouk Lee; Mang Xu; Jiajin Zhang — 2017

Czechoslovak Mathematical Journal

We describe the relation between quasi-minuscule representations, polytopes and Weyl group orbits in Picard lattices of rational surfaces. As an application, to each quasi-minuscule representation we attach a class of rational surfaces, and realize such a representation as an associated vector bundle of a principal bundle over these surfaces. Moreover, any quasi-minuscule representation can be defined by rational curves, or their disjoint unions in a rational surface, satisfying certain natural...

Gosset polytopes in integral octonions

Woo-Nyoung Chang; Jae-Hyouk Lee; Sung Hwan Lee; Young Jun Lee — 2014

Czechoslovak Mathematical Journal

We study the integral quaternions and the integral octonions along the combinatorics of the $24$ -cell, a uniform polytope with the symmetry $D_{4}$ , and the Gosset polytope $4_{21}$ with the symmetry $E_{8}$ . We identify the set of the unit integral octonions or quaternions as a Gosset polytope $4_{21}$ or a $24$ -cell and describe the subsets of integral numbers having small length as certain combinations of unit integral numbers according to the $E_{8}$ or $D_{4}$ actions on the $4_{21}$ or the $24$ -cell, respectively. Moreover, we show that each...

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Currently displaying 1 – 3 of 3

Symplectic geometry on symplectic knot spaces.

Polytopes, quasi-minuscule representations and rational surfaces

Gosset polytopes in integral octonions