Skip to main content

The geometry of algorithms with orthogonality constraints

Cornell Affiliated Author(s)

Author

A. Edelman
Tomas Arias
S.T. Smith

Abstract

In this paper we develop new Newton and conjugate gradient algorithms on the Grassmann and Stiefel manifolds. These manifolds represent the constraints that arise in such areas as the symmetric eigenvalue problem, nonlinear eigenvalue problems, electronic structures computations, and signal processing. In addition to the new algorithms, we show how the geometrical framework gives penetrating new insights allowing us to create, understand, and compare algorithms. The theory proposed here provides a taxonomy for numerical linear algebra algorithms that provide a top level mathematical view of previously unrelated algorithms. It is our hope that developers of new algorithms and perturbation theories will benefit from the theory, methods, and examples in this paper.

Date Published

Journal

SIAM Journal on Matrix Analysis and Applications

Volume

20

Issue

2

Number of Pages

303-353,

URL

https://www.scopus.com/inward/record.uri?eid=2-s2.0-0032216898&doi=10.1137%2fS0895479895290954&partnerID=40&md5=b957a0fd8644285cfac9f271717376bd

DOI

10.1137/S0895479895290954

Group (Lab)

Tomas Arias Group

Download citation