Rigidity of differential operators and Chern numbers of singular varieties

TL;DR

This paper surveys rigidity theorems related to the elliptic genus and explores their applications in defining Chern numbers on singular varieties, linking differential operator rigidity to topological invariants.

Contribution

It provides a comprehensive overview of rigidity theorems for the elliptic genus and introduces methods for constructing Chern numbers on singular spaces.

Findings

Rigidity of differential operators is connected to defining Chern numbers on singular varieties.

The elliptic genus exhibits rigidity properties useful for topological invariants.

Applications include new approaches to singular Chern number construction.

Abstract

A differential operator $D$ commuting with an $S^1$-action is said to be rigid if the non-constant Fourier coefficients of $\ker D$ and $\coker D$ are the same. Somewhat surprisingly, the study of rigid differential operators turns out to be closely related to the problem of defining Chern numbers on singular varieties. This relationship comes into play when we make use of the rigidity properties of the complex elliptic genus--essentially an infinite-dimensional analogue of a Dirac operator. This paper is a survey of rigidity theorems related to the elliptic genus, and their applications to the construction "singular" Chern numbers.