Abstract
Indefinite symmetric matrices occur in many applications, such as optimization, least squares problems, partial differential equations, and variational problems. In these applications one is often interested in computing a factorization of the indefinite matrix that puts into evidence the inertia of the matrix or possibly provides an estimate of its eigenvalues. In this paper we propose an algorithm that provides this information for any symmetric indefinite matrix by transforming it to a block antitriangular form using orthogonal similarity transformations. We also show that the algorithm is backward stable and has a complexity that is comparable to existing matrix decompositions for dense indefinite matrices.
Anno
2013
Autori IAC
Tipo pubblicazione
Altri Autori
Mastronardi, Nicola; Van Dooren, Paul
Editore
Society for Industrial and Applied Mathematics ,
Rivista
SIAM journal on matrix analysis and applications (Print)
