AbstractLet F be field, and let A and B be n × n matrices with elements in F. Suppose that A is completely reducible and that B is symmetric. If the principal minors of A determined by the 1- and 2-circuits of the graph of B and by the chordless circuits of the graph of A are equal to the corresponding principal minors of B, then A is diagonally similar to B; and conversely
Each square complex matrix is unitarily similar to an upper triangular matrix with diagonal entries ...
AbstractIt has been known for some time that every polynomial with coefficients from a finite field ...
It has been known for some time that every polynomial with coefficients from a finite field is the ...
AbstractLet A, B be n × n matrices with entries in a field F. We say A and B satisfy property D if B...
AbstractLet A, B be n × n matrices with entries in a field F. Our purpose is to show the following t...
AbstractLet A, B be n × n matrices with entries in a field F. We say A and B satisfy property D if B...
AbstractLet A, B be n × n matrices with entries in a field F. Our purpose is to show the following t...
AbstractThree equivalence relations are considered on the set of n × n matrices with elements in F0,...
AbstractIf K is an algebraic function field in one variable over an algebraically closed field k, th...
In this paper we shall discuss when an invertible matrix and its inverse are similar.We shall...
AbstractThis paper is concerned with the interdependence of the irreducible constituents of an algeb...
Suppose that A and B are two complex n×n matrices. What is the sufficient or necessary condition suc...
AbstractWe prove that if A=[Aij]∈RN,N is a block symmetric matrix and y is a solution of a nearby li...
AbstractIn this work, we give a new and elementary proof that simultaneous similarity and simultaneo...
AbstractIf A is an n × n matrix over an infinite field F, k is a positive integer, and R is an arbit...
Each square complex matrix is unitarily similar to an upper triangular matrix with diagonal entries ...
AbstractIt has been known for some time that every polynomial with coefficients from a finite field ...
It has been known for some time that every polynomial with coefficients from a finite field is the ...
AbstractLet A, B be n × n matrices with entries in a field F. We say A and B satisfy property D if B...
AbstractLet A, B be n × n matrices with entries in a field F. Our purpose is to show the following t...
AbstractLet A, B be n × n matrices with entries in a field F. We say A and B satisfy property D if B...
AbstractLet A, B be n × n matrices with entries in a field F. Our purpose is to show the following t...
AbstractThree equivalence relations are considered on the set of n × n matrices with elements in F0,...
AbstractIf K is an algebraic function field in one variable over an algebraically closed field k, th...
In this paper we shall discuss when an invertible matrix and its inverse are similar.We shall...
AbstractThis paper is concerned with the interdependence of the irreducible constituents of an algeb...
Suppose that A and B are two complex n×n matrices. What is the sufficient or necessary condition suc...
AbstractWe prove that if A=[Aij]∈RN,N is a block symmetric matrix and y is a solution of a nearby li...
AbstractIn this work, we give a new and elementary proof that simultaneous similarity and simultaneo...
AbstractIf A is an n × n matrix over an infinite field F, k is a positive integer, and R is an arbit...
Each square complex matrix is unitarily similar to an upper triangular matrix with diagonal entries ...
AbstractIt has been known for some time that every polynomial with coefficients from a finite field ...
It has been known for some time that every polynomial with coefficients from a finite field is the ...
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