English

Optimization on flag manifolds

Optimization and Control 2019-08-08 v2 Differential Geometry

Abstract

A flag is a sequence of nested subspaces. Flags are ubiquitous in numerical analysis, arising in finite elements, multigrid, spectral, and pseudospectral methods for numerical PDE; they arise in the form of Krylov subspaces in matrix computations, and as multiresolution analysis in wavelets constructions. They are common in statistics too --- principal component, canonical correlation, and correspondence analyses may all be viewed as methods for extracting flags from a data set. The main goal of this article is to develop the tools needed for optimizing over a set of flags, which is a smooth manifold called the flag manifold, and it contains the Grassmannian as the simplest special case. We will derive closed-form analytic expressions for various differential geometric objects required for Riemannian optimization algorithms on the flag manifold; introducing various systems of extrinsic coordinates that allow us to parameterize points, metrics, tangent spaces, geodesics, distance, parallel transport, gradients, Hessians in terms of matrices and matrix operations; and thereby permitting us to formulate steepest descent, conjugate gradient, and Newton algorithms on the flag manifold using only standard numerical linear algebra.

Keywords

Cite

@article{arxiv.1907.00949,
  title  = {Optimization on flag manifolds},
  author = {Ke Ye and Ken Sze-Wai Wong and Lek-Heng Lim},
  journal= {arXiv preprint arXiv:1907.00949},
  year   = {2019}
}

Comments

27 pages, 2 figures

R2 v1 2026-06-23T10:09:06.221Z