A categorical reconstruction of crystals and quantum groups at q=0

Abstract

The quantum co-ordinate algebra Aq(g) associated to a Kac-Moody Lie algebra g forms a Hopf algebra whose comodules are precisely the Uq(g) modules in the BGG category Og. In this paper we investigate whether an analogous result is true when q=0. We classify crystal bases as coalgebras over a comonadic functor on the category of pointed sets and encode the monoidal structure of crystals into a bicomonadic structure. In doing this we prove that there is no coalgebra in the category of pointed sets whose comodules are equivalent to crystal bases. We then construct a bialgebra over Z whose based comodules are equivalent to crystals, which we conjecture is linked to Lusztig's quantum group at v = ∞.