A Contour-integral Based Method for Counting the Eigenvalues Inside a Region in the Complex Plane

TL;DR

This paper introduces a contour-integral based method that accurately counts the number of eigenvalues within a specified region in the complex plane, enhancing eigenvalue analysis techniques.

Contribution

The proposed method can exactly determine the number of eigenvalues inside a region, improving upon existing estimation approaches and aiding eigenvalue solvers.

Findings

Method accurately counts eigenvalues inside a region

Numerical experiments confirm viability

Can integrate with existing eigensolvers

Abstract

In many applications, the information about the number of eigenvalues inside a given region is required. In this paper, we propose a contour-integral based method for this purpose. The new method is motivated by two findings. There exist methods for estimating the number of eigenvalues inside a region in the complex plane. But our method is able to compute the number of eigenvalues inside the given region exactly. An appealing feature of our method is that it can integrate with the recently developed contour-integral based eigensolvers to help them detect whether all desired eigenvalues are found. Numerical experiments are reported to show the viability of our new method.