On categories O of quiver varieties overlying the bouquet graphs

Abstract

We study representation theory of quantizations of Nakajima quiver varieties associated to bouquet quivers. We show that there are no finite dimensional representations of the quantizations Aλ(n, ) if dim V=n is greater than 1 and so is the number of loops . We find that there is a Hamiltonian torus action with finitely many fixed points in case n≤ 3, provide the dimensions of Hom-spaces between standard objects in category O and compute the multiplicities of simples in standards for n=2 in case of one-dimensional framing and generic one-parameter subgroups. We establish the abelian localisation theorem and find the values of parameters, for which the quantizations have infinite homological dimension.