Add to ORKGIf K is an algebraic function field in one variable over an algebraically closed field k, then conditions are presented to insure that a matrix A ∈ M (K) is diagonalizable by means of a similarity transformation T ∈ GL(n, k). This result generalizes results of Friedland [1] and Motzkin-Taussky [4]. © 1989.
AbstractWe characterise the set of all linear mappings on the algebra of all n × n matrices that pre...
AbstractA matrix D is said to be diagonal if its (i,j)th element is null whenever i and j are unequa...
AbstractIn this paper the Hasse-Minkowski theorem is used over a number field to give necessary and ...
AbstractIf K is an algebraic function field in one variable over an algebraically closed field k, th...
AbstractIf K is an algebraic function field in one variable over an algebraically closed field k, th...
AbstractLet k be an algebraically closed field, and let X be a projective variety over k. Let A be a...
AbstractLet k be an algebraically closed field, and let X be a projective variety over k. Let A be a...
AbstractLet S be a set of n × n matrices over a field F, and A the algebra generated by S over F. Th...
A theorem is proved concerning the diagonalizability of a matrix over a differential field by means ...
AbstractA theorem is proved concerning the diagonalizability of a matrix over a differential field b...
AbstractWe consider the problem of simultaneously putting a set of square matrices into the same blo...
AbstractLet F denote a field such that char(F)≠2. It is shown that every square matrix over F is exp...
AbstractIn this paper we solve completely and explicitly the long-standing problem of classifying pa...
Let V be an arbitrary vector space over a field K, and let End(V) be the ring of all K-linear trans...
In this paper, the problem of simultaneous diagonalization of m-tuples of n-order square complex mat...
AbstractWe characterise the set of all linear mappings on the algebra of all n × n matrices that pre...
AbstractA matrix D is said to be diagonal if its (i,j)th element is null whenever i and j are unequa...
AbstractIn this paper the Hasse-Minkowski theorem is used over a number field to give necessary and ...
AbstractIf K is an algebraic function field in one variable over an algebraically closed field k, th...
AbstractIf K is an algebraic function field in one variable over an algebraically closed field k, th...
AbstractLet k be an algebraically closed field, and let X be a projective variety over k. Let A be a...
AbstractLet k be an algebraically closed field, and let X be a projective variety over k. Let A be a...
AbstractLet S be a set of n × n matrices over a field F, and A the algebra generated by S over F. Th...
A theorem is proved concerning the diagonalizability of a matrix over a differential field by means ...
AbstractA theorem is proved concerning the diagonalizability of a matrix over a differential field b...
AbstractWe consider the problem of simultaneously putting a set of square matrices into the same blo...
AbstractLet F denote a field such that char(F)≠2. It is shown that every square matrix over F is exp...
AbstractIn this paper we solve completely and explicitly the long-standing problem of classifying pa...
Let V be an arbitrary vector space over a field K, and let End(V) be the ring of all K-linear trans...
In this paper, the problem of simultaneous diagonalization of m-tuples of n-order square complex mat...
AbstractWe characterise the set of all linear mappings on the algebra of all n × n matrices that pre...
AbstractA matrix D is said to be diagonal if its (i,j)th element is null whenever i and j are unequa...
AbstractIn this paper the Hasse-Minkowski theorem is used over a number field to give necessary and ...