There, Reiner and Stanton showed that these lattices are rank symmetric and rank unimodal and conjectured that they are strongly Sperner. The second family of ...
Constructions of representations of o(2n + 1;C) that imply Molev and Reiner ... 1)th slot (Molev case). When i and j are “distant” nodes in the Dynkin ...
Constructions of representations of o(2n+1, C) that imply Molev and Reiner-Stanton lattices are strongly Sperner · 16 Citations · 12 References.
(2003), 255-282. [4] "Constructions of representations of o(2n+1,C) that imply Molev and Reiner-Stanton lattices are strongly Sperner" With S. J. Lewis and ...
Apr 25, 2024 · Constructions of representations of o(2n+1, C) that imply Molev and Reiner-Stanton lattices are strongly Sperner. Discret. Math. 263(1-3) ...
Constructions of representations of o(2n+1, C) that imply Molev and Reiner-Stanton lattices are strongly Sperner. Article. Feb 2003; DISCRETE MATH.
Constructions of representations of o(2n+1, C) that imply Molev and Reiner-Stanton lattices are strongly Sperner. Discret. Math. 263(1-3): 61-79 (2003). [+] ...
Pervine, “Constructions of representations of o(2n +1, C) that imply Molev and Reiner-Stanton lattices are strongly Sperner,” Discrete Math. 263 (2003), 61 ...
Constructions of representations of o(2n + 1, C) that imply Molev and Reiner-Stanton lattices are strongly Sperner · Author Picture Robert G. Donnelly.
Constructions of representations of o(2n+1, C) that imply Molev and Reiner-Stanton lattices are strongly Sperner · Mathematics. Discrete Mathematics · 2003.