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Displaying 21 – 40 of 129

Application du théorème de Sylvester à la localisation des valeurs propres de $A X = λ B X$ dans le cas symétrique

Yves Haugazeau (1980)

ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique

Block Factorization of Hankel Matrices and Euclidean Algorithm

S. Belhaj (2010)

Mathematical Modelling of Natural Phenomena

It is shown that a real Hankel matrix admits an approximate block diagonalization in which the successive transformation matrices are upper triangular Toeplitz matrices. The structure of this factorization was first fully discussed in [1]. This approach is extended to obtain the quotients and the remainders appearing in the Euclidean algorithm applied to two polynomials u(x) and v(x) of degree n and m, respectively, whith m < ...

Boosting the inverse interpolation problem by a sum of decaying exponentials using an algebraic approach.

Paluszny, Marco, Martín-Landrove, Miguel, Figueroa, Giovanni, Torres, Wuilian (2008)

ETNA. Electronic Transactions on Numerical Analysis [electronic only]

Brève communication. Matrices tridiagonales symétriques et matrices factorisables

J. Baranger, M. Duc-Jacquet (1971)

ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique

Carathéodory solutions to quasi-linear hyperbolic systems of partial differential equations with state dependent delays

Gołaszewska, Agata, Turo, Jan (2007)

Proceedings of Equadiff 11

Clean matrices over commutative rings

Huanyin Chen (2009)

Czechoslovak Mathematical Journal

A matrix $A \in M_{n} (R)$ is $e$ -clean provided there exists an idempotent $E \in M_{n} (R)$ such that $A - E \in {GL}_{n} (R)$ and $det E = e$ . We get a general criterion of $e$ -cleanness for the matrix $[[a_{1}, a_{2}, \dots, a_{n + 1}]]$ . Under the $n$ -stable range condition, it is shown that $[[a_{1}, a_{2}, \dots, a_{n + 1}]]$ is $0$ -clean iff $(a_{1}, a_{2}, \dots, a_{n + 1}) = 1$ . As an application, we prove that the $0$ -cleanness and unit-regularity for such $n \times n$ matrix over a Dedekind domain coincide for all $n \geq 3$ . The analogous for $(s, 2)$ property is also obtained.

Combinatorial aspects of generalized complementary basic matrices

Miroslav Fiedler, Frank Hall (2013)

Open Mathematics

This paper extends some properties of the generalized complementary basic matrices, in particular, in a combinatorial direction. These include inheritance (such as for Alternating Sign Matrices), spectral, and sign pattern matrix (including sign nonsingularity) properties.

Completing block Hermitian matrices with maximal and minimal ranks and inertias.

Tian, Yongge (2010)

ELA. The Electronic Journal of Linear Algebra [electronic only]

Computing the CS Decomposition of a Partitioned Orthonormal Matrix

G.W. Stewart (1982)

Numerische Mathematik

Conjugacy and factorization results on matrix groups

Thomas Laffey (1994)

Banach Center Publications

In this survey paper, we present (mainly without proof) a number of results on conjugacy and factorization in general linear groups over fields and commutative rings. We also present the additive analogue in matrix rings of some of these results. The first section deals with the question of expressing elements in the commutator subgroup of the general linear group over a field as (simple) commutators. In Section 2, the same kind of problem is discussed for the general linear group over a commutative...

Counting determinants of Fibonacci-Hessenberg matrices using LU factorizations.

Li, Hsuan-Chu, Chen, Young-Ming, Tan, Eng-Tjioe (2009)

Integers

Décomposition des matrices en facteurs singuliers Applications aux équations différentielles

Gilles Christol (1979/1981)

Groupe de travail d'analyse ultramétrique

Determinant Representations of Sequences: A Survey

A. R. Moghaddamfar, S. Navid Salehy, S. Nima Salehy (2014)

Special Matrices

This is a survey of recent results concerning (integer) matrices whose leading principal minors are well-known sequences such as Fibonacci, Lucas, Jacobsthal and Pell (sub)sequences. There are different ways for constructing such matrices. Some of these matrices are constructed by homogeneous or nonhomogeneous recurrence relations, and others are constructed by convolution of two sequences. In this article, we will illustrate the idea of these methods by constructing some integer matrices of this...

Currently displaying 21 – 40 of 129

Previous Page 2 Next

Displaying 21 – 40 of 129

Application du théorème de Sylvester à la localisation des valeurs propres de $A X = λ B X$ dans le cas symétrique

Block Factorization of Hankel Matrices and Euclidean Algorithm

Boosting the inverse interpolation problem by a sum of decaying exponentials using an algebraic approach.

Brève communication. Matrices tridiagonales symétriques et matrices factorisables

Carathéodory solutions to quasi-linear hyperbolic systems of partial differential equations with state dependent delays

Clean matrices over commutative rings

Combinatorial aspects of generalized complementary basic matrices

Completing block Hermitian matrices with maximal and minimal ranks and inertias.

Computing the CS Decomposition of a Partitioned Orthonormal Matrix

Conjugacy and factorization results on matrix groups

Counting determinants of Fibonacci-Hessenberg matrices using LU factorizations.

Décomposition des matrices en facteurs singuliers Applications aux équations différentielles

Determinant Representations of Sequences: A Survey

Determinants of multiplicative Toeplitz matrices

Discrete linear regulator revisited

Eight-dimensional real quadratic division algebras.

Eine Faktorisierung der bei der rationalen Interpolation auftretenden Matrizen.

Erratum. Factorization Iterative Methods, M-operators and H-Operators. (Num. Math. 31, 335-357 (1979)).

Erratum to On feebly nil-clean rings

Existence theorems for commutative diagrams.

Currently displaying 21 – 40 of 129