I'll review results and examples of the invariance and monodromy
of microlocal sheaves under mutations of their support. Then I'll
suggest some problems in geometric representation theory where we
would like to apply such techniques.
I will present a finite-dimensional quiver algebra whose
representations are equivalent to the category of
Schubert-constructible perverse sheaves on the Grassmannian
$Gr(k,n)$. The functor inducing the equivalence is constructed by
analyzing the...
For homogeneous affine Springer fibers (those with $G_m$
symmetry), we realize them as Lagrangian cycles inside ambient
symplectic varieties, and make sense of microlocal sheaves
supported on these affine Springer fibers. We also propose a...
I will start by recalling the notion of microlocal perverse
sheaves and then briefly explain meldings. The rest of the talk is
devoted to explaining the ideas involved in the proof of the
codimension-three conjecture.
Perverse sheaves and intersection cohomology are central objects
in geometric representation theory. This talk is about their
long-lost K-theoretic cousins, called K-motives. We will discuss
definitions and basic properties of K-motives and explore...
