Let F be an algebraically closed field. This paper describes the possible numbers of nonconstant invariant polynomials of the Jordan product X A + A X, when A is fixed and X varies. © 2002 Elsevier Science Inc. All rights reserved.Centro de Estruturas Lineares e Combinatória
We study the possible numbers of nonconstant invariant polynomials of the matrix commutator XA - AX,...
AbstractDenote by [X,Y] the additive commutator XY−YX of two square matrices X, Y over a field F. In...
AbstractWe study the possibilities for the number of nontrivial invariant polynomials of the product...
AbstractLet F be an algebraically closed field. This paper describes the possible numbers of noncons...
We study the possibilities for the number of nontrivial invariant polynomials of the product of two ...
We study the possible numbers of nonconstant invariant polynomials of the matrix commutator XA-AX; w...
AbstractWe study the possible numbers of nonconstant invariant polynomials of the matrix commutator ...
Denote by [X, Y] the additive commutator XY - YX of two square matrices X, Y over a field F. In a pr...
AbstractDenote by [X,Y] the additive commutator XY−YX of two square matrices X, Y over a field F. In...
This paper studies the possible eigenvalues of the Jordan product XA+AX, when A is fixed and X varie...
AbstractWe study the possible numbers of nonconstant invariant polynomials of the matrix commutator ...
AbstractConsider a n×n matrix partitioned into k×k blocks: C=[Ci,j], where C1,1,…,Ck,k are square. T...
doi:10.1016/S0024-3795(00)00334-7We study the possible eigenvalues, ranks and numbers of nonconstant...
AbstractWe study the possible eigenvalues, ranks and numbers of nonconstant invariant polynomials of...
For = ℝ or ℂ we exhibit a Jordan-algebra norm ⎮·⎮ on the simple associative algebra $M_{∞}()$ with ...
We study the possible numbers of nonconstant invariant polynomials of the matrix commutator XA - AX,...
AbstractDenote by [X,Y] the additive commutator XY−YX of two square matrices X, Y over a field F. In...
AbstractWe study the possibilities for the number of nontrivial invariant polynomials of the product...
AbstractLet F be an algebraically closed field. This paper describes the possible numbers of noncons...
We study the possibilities for the number of nontrivial invariant polynomials of the product of two ...
We study the possible numbers of nonconstant invariant polynomials of the matrix commutator XA-AX; w...
AbstractWe study the possible numbers of nonconstant invariant polynomials of the matrix commutator ...
Denote by [X, Y] the additive commutator XY - YX of two square matrices X, Y over a field F. In a pr...
AbstractDenote by [X,Y] the additive commutator XY−YX of two square matrices X, Y over a field F. In...
This paper studies the possible eigenvalues of the Jordan product XA+AX, when A is fixed and X varie...
AbstractWe study the possible numbers of nonconstant invariant polynomials of the matrix commutator ...
AbstractConsider a n×n matrix partitioned into k×k blocks: C=[Ci,j], where C1,1,…,Ck,k are square. T...
doi:10.1016/S0024-3795(00)00334-7We study the possible eigenvalues, ranks and numbers of nonconstant...
AbstractWe study the possible eigenvalues, ranks and numbers of nonconstant invariant polynomials of...
For = ℝ or ℂ we exhibit a Jordan-algebra norm ⎮·⎮ on the simple associative algebra $M_{∞}()$ with ...
We study the possible numbers of nonconstant invariant polynomials of the matrix commutator XA - AX,...
AbstractDenote by [X,Y] the additive commutator XY−YX of two square matrices X, Y over a field F. In...
AbstractWe study the possibilities for the number of nontrivial invariant polynomials of the product...
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