Relative Richardson Varieties

TL;DR

This paper introduces relative Richardson varieties, extending classical Richardson varieties to a relative setting over a base scheme, and explores their geometric properties, local structure, and applications to Brill-Noether theory.

Contribution

It generalizes the concept of Richardson varieties to a relative context, defining versality, and extends geometric and cohomological properties to this new setting.

Findings

Relative Richardson varieties share many properties with classical Richardson varieties.

The local geometry is governed by intersecting Schubert varieties, generalizing known theorems.

Applications to Brill-Noether varieties on elliptic curves and conjectures for higher genus.

Abstract

A Richardson variety in a flag variety is an intersection of two Schubert varieties defined by transverse flags. We define and study relative Richardson varieties, which are defined over a base scheme with a vector bundle and two flags. To do so, we generalize transversality of flags to a relative notion, versality, that allows the flags to be non-transverse over some fibers. Relative Richardson varieties share many of the geometric properties of Richardson varieties. We generalize several geometric and cohomological facts about Richardson varieties to relative Richardson varieties. We also prove that the local geometry of a relative Richardson variety is governed, in a precise sense, by the two intersecting Schubert varieties, giving a generalization, in the flag variety case, of a theorem of Knutson-Woo-Yong; we also generalize this result to intersections of arbitrarily many relative Schubert varieties. We give an application to Brill-Noether varieties on elliptic curves, and a conjectural generalization to higher genus curves.