Abstract
The generalized Schur algorithm is a powerful tool allowing to compute classical
decompositions of matrices, such as the QR and LU factorizations. When applied to matrices with
particular structures, the generalized Schur algorithm computes these factorizations with a complexity
of one order of magnitude less than that of classical algorithms based on Householder or elementary
transformations. In this manuscript, we describe the main features of the generalized Schur algorithm.
We show that it helps to prove some theoretical properties of the R factor of the QR factorization of
some structured matrices, such as symmetric positive definite Toeplitz and Sylvester matrices, that
can hardly be proven using classical linear algebra tools. Moreover, we propose a fast implementation
of the generalized Schur algorithm for computing the rank of Sylvester matrices, arising in a number
of applications. Finally, we propose a generalized Schur based algorithm for computing the null-space
of polynomial matrices.
Anno
2018
Autori IAC
Tipo pubblicazione
Altri Autori
Laudadio T., Mastronardi N., Van Dooren P.
Editore
Molecular Diversity Preservation International
Rivista
Axioms