Semigroups of Matrices

<p>This monograph provides a modern introduction to the theory of quantales.<p></p><p>First coined by C.J. Mulvey in 1986, quantales have since developed into a significant topic at the crossroads of algebra and logic, of notable interest to theoretical computer science. This book recasts the subjec

Skew spectrum of the Cartesian product of an oriented graph with an oriented hypercube / A. Anuradha, R. Balakrishnan -- Notes on explicit block diagonalization / Murali K. Srinivasan -- The third immanant of q-Laplacian matrices of trees and Laplacians of regular graphs / R.B. Bapat -- Matrix prod

<p>This book consists of eighteen articles in the area of `Combinatorial Matrix Theory' and `Generalized Inverses of Matrices'. Original research and expository articles presented in this publication are written by leading Mathematicians and Statisticians working in these areas. The articles contain

Lincoln Laboratorty, 1965. - pp.<div class="bb-sep"></div>The purpose of this report is to define a useful shorthand notation for dealing with matrix functions and to use these results in order to compute the gradient matrices of several scalar functions of matrices.

''Preface On the surface, matrix theory and graph theory are seemingly very different branches of mathematics. However, these two branches of mathematics interact since it is often convenient to represent a graph as a matrix. Adjacency, Laplacian, and incidence matrices are commonly used to represen

On the surface, matrix theory and graph theory seem like very different branches of mathematics. However, adjacency, Laplacian, and incidence matrices are commonly used to represent graphs, and many properties of matrices can give us useful information about the structure of graphs. Applications of