EUDML

In any C domain, there is nonzero harmonic function C continuous up to the boundary such that the function and its gradient on the boundary vanish on a set of positive measure.

Inbuilt mechanisms for overcoming functional problems inherent in hepatic microlobular structure.

Cohen, Robert D.; Brown, Christopher L.; Nickols, Carole; Levey, Pauline; Boucher, Barbara J.; Greenwald, Stephen E.; Wang, Wen — 2011

Computational & Mathematical Methods in Medicine

The Generalized Saddle-Node Bifurcation of Degenerate Solution

Ping Liu; Yu-Wen Wang — 2005

Commentationes Mathematicae

In this paper we discuss the bifurcation problem for the abstract operator equation of the form $F (u, λ) = θ$ with a parameter $λ$ , where $F : X \times R \to Y$ is a $C^{1}$ mapping, $X, Y$ are Banach spaces. By the bounded linear generalized inverse $A^{+}$ of $A = F_{u} (u_{0}, λ_{0})$ , an abstract bifurcation theorem for the case $dim N (F_{u} (u_{0}, λ_{0})) \geq codim R (F_{u} (u_{0}, λ_{0})) = 1$ has been obtained.

The Re-nonnegative definite solutions to the matrix equation $A X B = C$

Qing Wen Wang; Chang Lan Yang — 1998

Commentationes Mathematicae Universitatis Carolinae

An $n \times n$ complex matrix $A$ is called Re-nonnegative definite (Re-nnd) if the real part of $x^{*} A x$ is nonnegative for every complex $n$ -vector $x$ . In this paper criteria for a partitioned matrix to be Re-nnd are given. A necessary and sufficient condition for the existence of and an expression for the Re-nnd solutions of the matrix equation $A X B = C$ are presented.

A new solvable condition for a pair of generalized Sylvester equations.

Wang, Qing-Wen; Zhang, Hua-Sheng; Song, Guang-Jing — 2009

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

On solutions to the quaternion matrix equation $A X B + C Y D = E$ .

Wang, Qing-Wen; Zhang, Hua-Sheng; Yu, Shao-Wen — 2008

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

Inertias and ranks of some Hermitian matrix functions with applications

Xiang Zhang; Qing-Wen Wang; Xin Liu — 2012

Open Mathematics

Let S be a given set consisting of some Hermitian matrices with the same size. We say that a matrix A ∈ S is maximal if A − W is positive semidefinite for every matrix W ∈ S. In this paper, we consider the maximal and minimal inertias and ranks of the Hermitian matrix function f(X,Y) = P − QXQ* − TYT*, where * means the conjugate and transpose of a matrix, P = P*, Q, T are known matrices and for X and Y Hermitian solutions to the consistent matrix equations AX =B and YC = D respectively. As applications,...

Editors’ Summary of the Special Issue dedicated to the 5th International Conference on Matrix Analysis and Applications

Shaun Fallat; Shahla Nasserasr; Qing-Wen Wang; Fuzhen Zhang — 2016

Special Matrices

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An effective method for solving fractional integro-differential equations.

Infinite boundary value problems for second-order nonlinear impulsive differential equations with supremum.

A comparative analysis of the value of information in a continuous time market model with partial information: the cases of log-utility and CRRA.

Extreme ranks of (skew-)Hermitian solutions to a quaternion matrix equation.

The reflexive re-nonnegative definite solution to a quaternion matrix equation.