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Displaying 21 – 40 of 254

Shells of matrices in indefinite inner product spaces.

Bolotnikov, Vladimir, Li, Chi-Kwong, Meade, Patrick R., Mehl, Christian, Rodman, Leiba (2002)

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

Short proofs of theorems of Mirsky and Horn on diagonals and eigenvalues of matrices.

Carlen, Eric A., Lieb, Elliott H. (2009)

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

Sign patterns that allow eventual positivity.

Berman, Abraham, Catral, Minerva, Dealba, Luz Maria, Elhashash, Abed, Hall, Frank J., Hogben, Leslie, Kim, In-Jae, Olesky, Dale D., Tarazaga, Pablo, Tsatsomeros, Michael J., van den Driessche, Pauline (2009)

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

Sign patterns that require a positive or nonnegative left inverse.

Kim, In-Jae, Shader, Bryan L. (2008)

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

Sign patterns that require eventual positivity or require eventual nonnegativity.

Ellison, Elisabeth M., Hogben, Leslie, Tsatsomeros, Michael J. (2009)

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

Sign patterns that require or allow power-positivity.

Catral, Minerva, Hogben, Leslie, Olesky, Dale D., van den Driessche, Pauline (2009)

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

Signatura of magic and Latin integer squares: isentropic clans and indexing

Ian Cameron, Adam Rogers, Peter D. Loly (2013)

Discussiones Mathematicae Probability and Statistics

The 2010 study of the Shannon entropy of order nine Sudoku and Latin square matrices by Newton and DeSalvo [Proc. Roy. Soc. A 2010] is extended to natural magic and Latin squares up to order nine. We demonstrate that decimal and integer measures of the Singular Value sets, here named SV clans, are a powerful way of comparing different integer squares. Several complete sets of magic and Latin squares are included, including the order eight Franklin subset which is of direct relevance...

Sign-consistency and solvability of constrained linear systems.

Lee, Gwang-Yeon, Shader, Bryan L. (1998)

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

Similarities of discrete and continuous Sturm-Liouville problems.

Ghanbari, Kazem (2007)

Electronic Journal of Differential Equations (EJDE) [electronic only]

Simple conditions for practical stability of positive fractional discrete-time linear systems

Mikołaj Busłowicz, Tadeusz Kaczorek (2009)

International Journal of Applied Mathematics and Computer Science

In the paper the problem of practical stability of linear positive discrete-time systems of fractional order is addressed. New simple necessary and sufficient conditions for practical stability and for practical stability independent of the length of practical implementation are established. It is shown that practical stability of the system is equivalent to asymptotic stability of the corresponding standard positive discrete-time systems of the same order. The discussion is illustrated with numerical...

Simple multilinear algebras and hermitian operators

T. S. R. Fuad, Jon D. Phillips, Xiaorong Shen, Jonathan D. H. Smith (2000)

Commentationes Mathematicae Universitatis Carolinae

The paper studies multilinear algebras, known as comtrans algebras, that are determined by so-called $T$ -Hermitian matrices over an arbitrary field. The main result of this paper shows that the comtrans algebra of $n$ -dimensional $T$ -Hermitian matrices furnishes a simple comtrans algebra.

Simultaneous complements in n-spaces - an elementary proof

Craveiro de Carvalho, F.J., Sampaio Martins, J.A. (1987)

Portugaliae mathematica

Simultaneous Iteration for Computing Invariant Subspaces of Non-Hermitian Matrices.

G. W. Stewart (1975/1976)

Numerische Mathematik

Simultaneous solution of linear equations and inequalities in max-algebra

Abdulhadi Aminu (2011)

Kybernetika

Let $a ø p l u s b = max (a, b)$ and $a ø t i m e s b = a + b$ for $a, b \in ℝ$ . Max-algebra is an analogue of linear algebra developed on the pair of operations $(ø p l u s, ø t i m e s)$ extended to matrices and vectors. The system of equations $A ø t i m e s x = b$ and inequalities $C ø t i m e s x ł e q d$ have each been studied in the literature. We consider a problem consisting of these two systems and present necessary and sufficient conditions for its solvability. We also develop a polynomial algorithm for solving max-linear program whose constraints are max-linear equations and inequalities.

Simultaneous solutions of operator Sylvester equations

Sang-Gu Lee, Quoc-Phong Vu (2014)

Studia Mathematica

We consider simultaneous solutions of operator Sylvester equations $A_{i} X - X B_{i} = C_{i}$ (1 ≤ i ≤ k), where $(A ₁, . . ., A_{k})$ and $(B ₁, . . ., B_{k})$ are commuting k-tuples of bounded linear operators on Banach spaces and ℱ, respectively, and $(C ₁, . . ., C_{k})$ is a (compatible) k-tuple of bounded linear operators from ℱ to , and prove that if the joint Taylor spectra of $(A ₁, . . ., A_{k})$ and $(B ₁, . . ., B_{k})$ do not intersect, then this system of Sylvester equations has a unique simultaneous solution.

Sincere posets of finite prinjective type with three maximal elements and their sincere prinjective representations

Justyna Kosakowska (2002)

Colloquium Mathematicae

Assume that K is an arbitrary field. Let (I,⪯) be a poset of finite prinjective type and let KI be the incidence K-algebra of I. A classification of all sincere posets of finite prinjective type with three maximal elements is given in Theorem 2.1. A complete list of such posets consisting of 90 diagrams is presented in Tables 2.2. Moreover, given any sincere poset I of finite prinjective type with three maximal elements, a complete set of pairwise non-isomorphic sincere indecomposable prinjective...

Singular bilateral boundary value problems for discrete generalized Lyapunov matrix equations.

Lucas Jódar Sánchez (1987)

Stochastica

Existence and uniqueness conditions for solving singular initial and two-point boundary value problems for discrete generalized Lyapunov matrix equations and explicit expressions of solutions are given.

Singular differences of powers of $2 \times 2$ -matrices

J.-H. Evertse, R. Tijdeman (1996)

Compositio Mathematica

Singular Generalised Autunomous Linear Differential Systems

Evangelos Grispos (1992)

Δελτίο της Ελληνικής Μαθηματικής Εταιρίας

Singular M-matrices which may not have a nonnegative generalized inverse

Agrawal N. Sushama, K. Premakumari, K.C. Sivakumar (2014)

Special Matrices

A matrix A ∈ ℝn×n is a GM-matrix if A = sI − B, where 0 < ρ(B) ≤ s and B ∈WPFn i.e., both B and Bt have ρ(B) as their eigenvalues and their corresponding eigenvector is entry wise nonnegative. In this article, we consider a generalization of a subclass of GM-matrices having a nonnegative core nilpotent decomposition and prove a characterization result for such matrices. Also, we study various notions of splitting of matrices from this new class and obtain sufficient conditions for their convergence....

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