Pointwise purity, derived Satake, and Symplectic duality (2508.15958v1)
Abstract: It has been known for a long time that Ext's between IC-sheaves may often be expressed in terms of Hom's between cohomology groups. We prove a more general result under weaker assumptions. The result is used to describe the action of the derived Satake equivalence on !-pure objects and show that the equivalence enjoys a new kind of functoriality with respect to morphisms of reductive groups. We find and prove normality of the symplectic dual X! for many smooth affine Hamiltonian G-varieties X, including X=T*(G/H) for all connected reductive subgroups H of G. We also describe the symplectic duals M! in the case of Coulomb branches and prove that M! has symplectic singularities.
Paper Prompts
Sign up for free to create and run prompts on this paper using GPT-5.
Top Community Prompts
Collections
Sign up for free to add this paper to one or more collections.