A generalization of Fulton's conjecture for arbitrary groups

Prakash Belkale; Shrawan Kumar; Nicolas Ressayre

arXiv:1004.4379·math.AG·April 27, 2010

A generalization of Fulton's conjecture for arbitrary groups

Prakash Belkale, Shrawan Kumar, Nicolas Ressayre

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TL;DR

This paper extends Fulton's conjecture, linking intersection theory on flag varieties to invariant theory, providing a broader understanding applicable to all groups.

Contribution

It generalizes Fulton's conjecture, establishing a new connection between intersection theory and invariant theory for arbitrary groups.

Findings

01

Proves a generalized version of Fulton's conjecture

02

Establishes a link between intersection theory and invariant theory

03

Applicable to all groups and flag varieties

Abstract

We prove a generalization of Fulton's conjecture which relates intersection theory on an arbitrary flag variety to invariant theory.

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Taxonomy

TopicsAlgebraic Geometry and Number Theory · Advanced Combinatorial Mathematics · Advanced Algebra and Geometry