Modified steepest descent and Newton algorithms for orthogonally constrained optimisation. Part II. The complex Grassmann manifold

Author

Manton, Jonathan H.

Author_Institution

Dept. of Electr. & Electron. Eng., Melbourne Univ., Parkville, Vic., Australia

Volume

1

fYear

2001

fDate

2001

Firstpage

84

Abstract

The classical steepest descent and Newton algorithms can be used to minimise a cost function f(X). This paper shows how they can be modified to take into account the constraint that the columns of the complex-valued matrix X are mutually orthogonal and have unit norm. It is assumed that the cost function satisfies f(XQ) = f(X) for any unitary matrix Q. This allows the constrained optimisation problem to be converted into an unconstrained one on the Grassmann manifold. This significantly reduces the dimension of the optimisation problem and often results in faster convergence

Keywords

Newton method; convergence of numerical methods; matrix algebra; minimisation; signal processing; Newton algorithm; complex Grassmann manifold; complex-valued matrix; convergence; cost function minimisation; modified steepest descent algorithm; orthogonally constrained optimisation; unconstrained optimisation problem; Australia Council; Constraint optimization; Convergence; Cost function; Eigenvalues and eigenfunctions; Manifolds; Matrix converters; Mercury (metals); Symmetric matrices; Taylor series;

fLanguage

English

Publisher

ieee

Conference_Titel

Signal Processing and its Applications, Sixth International, Symposium on. 2001

Conference_Location

Kuala Lumpur

Print_ISBN

0-7803-6703-0

Type

conf

DOI

10.1109/ISSPA.2001.949781

Filename

949781