Local cohomology with support in Schubert varieties

TL;DR

This paper develops a method using mixed Hodge modules and the Grothendieck--Cousin complex to compute local cohomology sheaves supported on Schubert varieties, revealing their composition factors and filtrations.

Contribution

It introduces a novel approach combining Kazhdan--Lusztig theory and mixed Hodge modules to analyze local cohomology in Schubert varieties, including explicit calculations.

Findings

Computed composition factors and weight filtrations for Schubert varieties in Grassmannians.

Established that the Grothendieck--Cousin complex underlies a mixed Hodge module complex.

Linked the weight filtration to augmented Dyck patterns of Raicu--Weyman.

Abstract

This paper is concerned with local cohomology sheaves on generalized flag varieties supported in closed Schubert varieties, which carry natural structures as (mixed Hodge) D-modules. We employ Kazhdan--Lusztig theory and Saito's theory of mixed Hodge modules to describe a general strategy to calculate the simple composition factors, Hodge filtration, and weight filtration on these modules. Our main tool is the Grothendieck--Cousin complex, introduced by Kempf, which allows us to relate the local cohomology modules in question to parabolic Verma modules over the corresponding Lie algebra. We show that this complex underlies a complex of mixed Hodge modules, and is thus endowed with Hodge and weight filtrations. As a consequence, strictness implies that computing cohomology commutes with taking associated graded with respect to both of these filtrations. We execute this strategy to calculate the composition factors and weight filtration for Schubert varieties in the Grassmannian, in particular showing that the weight filtration is controlled by the augmented Dyck patterns of Raicu--Weyman. As an application, upon restriction to the opposite big cell, we recover the simple composition factors and weight filtration on local cohomology with support in generic determinantal varieties.