The Electronic Journal of Linear Algebra
https://journals.uwyo.edu/index.php/ela
<p>The Electronic Journal of Linear Algebra (ELA), a publication of the <a href="https://www.ilasic.org/">International Linear Algebra Society (ILAS)</a>, is a refereed all-electronic journal that welcomes mathematical articles of high standards that contribute new information and new insights to matrix analysis and the various aspects of linear algebra and its applications. ELA is a JCR ranked journal, and indexed by MathSciNet, ZentralBlatt, and Scopus. ELA is completely free for authors/readers; and ELA is built on the selfless contributions of its authors, referees and editors.</p> <p><a href="https://en.wikipedia.org/wiki/Electronic_Journal_of_Linear_Algebra" target="_blank" rel="noopener"><img src="https://journals.uwyo.edu/public/site/images/dopico/wikipedia.png" alt="" width="62" height="62"></a></p>International Linear Algebra Societyen-USThe Electronic Journal of Linear Algebra1081-3810The numerical range of matrix products
https://journals.uwyo.edu/index.php/ela/article/view/8491
<p>We discuss what can be said about the numerical range of the matrix product $A_1A_2$ when the numerical ranges of $A_1$ and $A_2$ are known. If two compact convex subsets $K_1, K_2$ of the complex plane are given, we discuss the issue of finding a compact convex subset $K$ such that whenever $A_j$ ($j=1,2$) are either unrestricted matrices or normal matrices of the same shape with $W(A_j) \subseteq K_j$, it follows that $W(A_1A_2) \subseteq K$. We do this by defining specific deviation quantities for both the unrestricted case and the normal case.</p>Stephen Drury
Copyright (c) 2024 Stephen Drury
2024-03-042024-03-044030732110.13001/ela.2024.8491Commuting additive maps on upper triangular and strictly upper triangular infinite matrices
https://journals.uwyo.edu/index.php/ela/article/view/8381
<p>Let ${\mathbb F}$ be a field, let $N_{\infty}({\mathbb F})$ be the ring of all ${\mathbb N}\times {\mathbb N}$ strictly upper triangular matrices over ${\mathbb F,}$ and let $T_{\infty}({\mathbb F})$ be the ring of all ${\mathbb N}\times {\mathbb N}$ upper triangular matrices over ${\mathbb F}$. In this paper, we completely characterize additive maps $f:N_{\infty}({\mathbb F})\to T_{\infty}({\mathbb F})$ satisfying $[f(x),x]=0$ for all $x\in N_{\infty}({\mathbb F})$. As applications, we obtain the finite fields versions of the two main results recently obtained by Slowik and Ahmed [<em>Electron. J. Linear Algebra</em> 37:247-255, 2021].</p>Di-Chen LanCheng-Kai Liu
Copyright (c) 2024 Di-Chen Lan, Cheng-Kai Liu
2024-04-112024-04-114036136910.13001/ela.2024.8381A new weighted spectral geometric mean and properties
https://journals.uwyo.edu/index.php/ela/article/view/8325
<p>In this paper, we introduce a new weighted spectral geometric mean: \begin{equation*}\label{F-mean}<br />F_t(A,B)= (A^{-1}\sharp_t B)^{1/2} A^{2-2t} (A^{-1} \sharp_t B)^{1/2}, \quad t\in [0,1],<br />\end{equation*} where $A$ and $B$ are positive definite matrices. We study basic properties and inequalities for $F_t(A, B)$. We also establish the Lie-Trotter formula for $F_t(A, B)$. Finally, we extend some of the results on $F_t(A, B)$ to symmetric space of noncompact types.</p>Trung Hoa DinhTin-Yau TamTrung-Dung Vuong
Copyright (c) 2024 Trung Hoa Dinh, Tin-Yau Tam, Trung-Dung Vuong
2024-03-062024-03-064033334210.13001/ela.2024.8325Flag-shaped blockers of 123-avoiding permutation matrices
https://journals.uwyo.edu/index.php/ela/article/view/8177
<p>A blocker of $123$-avoiding permutation matrices refers to the set of zeros contained within an $n\times n$ $123$-forcing matrix. Recently, Brualdi and Cao provided a characterization of all minimal blockers, which are blockers with a cardinality of $n$. Building upon their work, a new type of blocker, flag-shaped blockers, which can be seen as a generalization of the $L$-shaped blockers defined by Brualdi and Cao, are introduced. It is demonstrated that all flag-shaped blockers are minimum blockers. The possible cardinalities of flag-shaped blockers are also determined, and the dimensions of subpolytopes that are defined by flag-shaped blockers are examined.</p>Megan BennettLei Cao
Copyright (c) 2024 Megan Bennett, Lei Cao
2024-02-072024-02-074020322310.13001/ela.2024.8177New properties of a special matrix related to positive-definite matrices
https://journals.uwyo.edu/index.php/ela/article/view/8165
<p>Let $H$ be a $2n\times 2n$ real symmetric positive-definite matrix. Suppose that $H\circ H=(H_{ij})_{2n\times 2n}$ is a partitioned matrix, in which $\circ$ represents the Hadamard product and the block $H_{ij}$ has order $n\times n$, $1\leq i,j \leq 2$. Several new properties on the matrix $\widetilde{H}$ are derived including inequalities that involve the symplectic eigenvalues and the usual eigenvalues, where $2\widetilde{H}=H_{11}+H_{22}+H_{12}+H_{21}$.</p>Shaowu HuangQing-Wen Wang
Copyright (c) 2024 Shaowu Huang, Qing-Wen Wang
2024-01-302024-01-304017217610.13001/ela.2024.8165