Columns and rows are operations for pairs of linear relations in Hilbert spaces, modelled on the corresponding notions of the componentwise sum and the usual sum of such pairs. The introduction of matrices whose entries are linear relations between underlying component spaces takes place via the row and column operations. The main purpose here is to offer an attempt to formalize the operational calculus for block matrices, whose entries are all linear relations. Each block relation generates a unique linear relation between the Cartesian products of initial and final Hilbert spaces that admits particular properties which will be characterized. Special attention is paid to the formal matrix multiplication of two blocks of linear relations an...
AbstractLet X, Y and Z be vector spaces and let T and S be linear relations from X to Y and Y to Z, ...
AbstractThis note gives a simple method to compute the entries of holomorphic functions of a 2×2 blo...
summary:Let $X$, $Y$ and $Z$ be normed linear spaces with $T(X\rightarrow Y)$ and $S(Y\rightarrow Z)...
Columns and rows are operations for pairs of linear relations in Hilbert spaces, modelled on the cor...
We present a few laws of linear algebra inspired by laws of relation algebra. The linear algebra law...
AbstractLet X,Y, and Z be linear spaces and let A and B be linear relations from X to Y and from Y t...
AbstractGiven two linear relations A and B we characterize the existence of a linear relation (opera...
In the lecture it is shown how to represent a linear operator by a matrix. This representation allow...
In this paper we study linear fractional relations defined in the following way. Let Hi, H′i, i = 1,...
The selfadjoint extensions of a closed linear relation R from a Hilbert space H1 to a Hilbert space ...
This book is the first of two volumes on linear algebra for graduate students in mathematics, the sc...
AbstractLet A+BXC and A+BX+YC be two linear matrix expressions, and denote by {A+BXC} and {A+BX+YC} ...
AbstractA set of formulas is given for the relations that exist between the first and last block now...
AbstractThe recursive relations given in Part I of this report can be interpreted as recursions for ...
This self-contained, clearly written textbook on linear algebra is easily accessible for students. I...
AbstractLet X, Y and Z be vector spaces and let T and S be linear relations from X to Y and Y to Z, ...
AbstractThis note gives a simple method to compute the entries of holomorphic functions of a 2×2 blo...
summary:Let $X$, $Y$ and $Z$ be normed linear spaces with $T(X\rightarrow Y)$ and $S(Y\rightarrow Z)...
Columns and rows are operations for pairs of linear relations in Hilbert spaces, modelled on the cor...
We present a few laws of linear algebra inspired by laws of relation algebra. The linear algebra law...
AbstractLet X,Y, and Z be linear spaces and let A and B be linear relations from X to Y and from Y t...
AbstractGiven two linear relations A and B we characterize the existence of a linear relation (opera...
In the lecture it is shown how to represent a linear operator by a matrix. This representation allow...
In this paper we study linear fractional relations defined in the following way. Let Hi, H′i, i = 1,...
The selfadjoint extensions of a closed linear relation R from a Hilbert space H1 to a Hilbert space ...
This book is the first of two volumes on linear algebra for graduate students in mathematics, the sc...
AbstractLet A+BXC and A+BX+YC be two linear matrix expressions, and denote by {A+BXC} and {A+BX+YC} ...
AbstractA set of formulas is given for the relations that exist between the first and last block now...
AbstractThe recursive relations given in Part I of this report can be interpreted as recursions for ...
This self-contained, clearly written textbook on linear algebra is easily accessible for students. I...
AbstractLet X, Y and Z be vector spaces and let T and S be linear relations from X to Y and Y to Z, ...
AbstractThis note gives a simple method to compute the entries of holomorphic functions of a 2×2 blo...
summary:Let $X$, $Y$ and $Z$ be normed linear spaces with $T(X\rightarrow Y)$ and $S(Y\rightarrow Z)...