Cocrystals of symplectic Kashiwara-Nakashima tableaux, symplectic Willis like direct way, virtual keys and applications

Abstract

We attach a sl2 crystal, called cocrystal, to a symplectic Kashiwara-Nakashima (KN) tableau, whose vertices are skew KN tableaux connected via the Lecouvey-Sheats symplectic jeu de taquin. These cocrystals contain all the needed information to compute right and left keys of a symplectic KN tableau. Motivated by Willis' direct way of computing type A right and left keys, we also give a way of computing symplectic, right and left, keys without the use of the symplectic jeu de taquin. On the other hand, we prove that Baker virtualization by folding A2n-1 into Cn commutes with dilatation of crystals. Thus we may alternatively utilize this Baker virtualization to embed a type Cn Demazure crystal, its opposite and atoms into A2n-1 ones. The right, respectively left keys of a KN tableau are thereby computed as A2n-1 semistandard tableaux and returned back via reverse Baker embedding to the Cn crystal as its right respectively left symplectic keys. In particular, Baker embedding also virtualizes the crystal of Lakshmibai-Seshadri paths as Bn-paths into the crystal of Lakshmibai-Seshadri paths as S2n-paths. Lastly, as an application of our explicit symplectic right and left key maps, thanks to the isomorphism between Lakshmibai-Seshadri path and Kashiwara crystals we use, similarly to the Gl(n,C) case, left and right key maps as a tool to test whether a symplectic KN tableau is standard on a Schubert or Richardson variety in the flag variety Sp(2n,C)/B, with B a Borel subgroup.