Shuffling functors and spherical twists on D b( O0)

Abstract

For a semisimple complex Lie algebra g, the BGG category O is of particular interest in representation theory. It is known that Irving's shuffling functors Shw, indexed by elements w∈ W of the Weyl group, induce an action of the braid group BW associated to W on the derived categories Db(Oλ) of blocks of O. We show that for maximal parabolic subalgebras p of sln corresponding to the parabolic subgroup Wp=Sn-1× S1 of Sn, the derived shuffling functors LShsi are instances of Seidel and Thomas' spherical twist functors. Namely, we show that certain parabolic indecomposable projectives Pp(w) are spherical objects, and the associated twist functors are naturally isomorphic to LShw[1] as auto-equivalences of Db(Op). We give an overview of the main properties of the BGG category O, the construction of shuffling and spherical twist functors, and give some examples how to determine images of both. To this end, we employ the equivalence of blocks of O and the module categories of certain path algebras.