Schubert calculus and Intersection theory of Flag manifolds

TL;DR

This paper reviews the development of Schubert calculus and intersection theory of flag manifolds, presenting a unified formula for characteristics and an algorithm for intersection rings, with practical examples.

Contribution

It introduces a unified formula for characteristics and a systematic method for intersection rings of flag manifolds, advancing the rigorous foundation of Schubert calculus.

Findings

Unified formula for characteristics of flag manifolds

Algorithm for intersection rings of flag manifolds

Explicit examples demonstrating the formulas' effectiveness

Abstract

Hilbert's 15th problem called for a rigorous foundation of Schubert's calculus, in which a long standing and challenging part is Schubert's problem of characteristics. In the course of securing the foundation of algebraic geometry, Van der Waerden and Andr\'{e} Weil attributed the problem to the determination of the intersection theory of flag manifolds. This article surveys the background, content, and resolution of the problem of characteristics. Our main results are a unified formula for the characteristics, and a system description for the intersection rings of flag manifolds. We illustrate the effectiveness of the formula and the algorithm via explicit examples.