Add to ORKGorem which states that an arbitrary square matrixM over an algebraically closed field can be decomposed into the form M = SJS−1 where S is an invertible matrix and J is a matrix in a Jordan canonical form, i.e. a special type of block diagonal matrix in which each block consists of Jordan blocks (see [13])
We treat the question of Jordan decomposition for R-orders, where R is an integrally closed noetheri...
We give a very short proof of the main result of J. Benitez, A new decomposition for square matrices...
Complex orthogonal matrices are orthogonal matrices with complex elements. Because the characterisat...
orem which states that an arbitrary square matrixM over an algebraically closed field can be decompo...
Let κ be an algebraically closed field of characteristic p ≥ 0. We shall consider the pro...
Abstract. Let K be an algebraically closed field of characteristic p> 0. We shall consider the pr...
All the demonstrations known to this author of the existence of the Jordan Canonical Form are somewh...
If F is an algebraically closed field, any element in Mn(F) is similar to a sum of a diagonal matrix...
Any linear transformation can be represented by its matrix representation. In an ideal situation, al...
If the characteristic polynomial of a linear operator is completely factored in scalar field ...
AbstractNewton's method is applied to construct the semi-simple part of the Jordan decomposition of ...
Jordan Canonical Form (JCF) is one of the most important, and useful, concepts in linear algebra. Th...
As a linear map, a derivation of a K-algebra can be decompoised into semi-simple part and nilpotent ...
AbstractIf the inverse of a square polynomial matrix L(s) is proper rational, then L(s)-1 can be wri...
AbstractWe treat the question of Jordan decomposition for R-orders, where R is an integrally closed ...
We treat the question of Jordan decomposition for R-orders, where R is an integrally closed noetheri...
We give a very short proof of the main result of J. Benitez, A new decomposition for square matrices...
Complex orthogonal matrices are orthogonal matrices with complex elements. Because the characterisat...
orem which states that an arbitrary square matrixM over an algebraically closed field can be decompo...
Let κ be an algebraically closed field of characteristic p ≥ 0. We shall consider the pro...
Abstract. Let K be an algebraically closed field of characteristic p> 0. We shall consider the pr...
All the demonstrations known to this author of the existence of the Jordan Canonical Form are somewh...
If F is an algebraically closed field, any element in Mn(F) is similar to a sum of a diagonal matrix...
Any linear transformation can be represented by its matrix representation. In an ideal situation, al...
If the characteristic polynomial of a linear operator is completely factored in scalar field ...
AbstractNewton's method is applied to construct the semi-simple part of the Jordan decomposition of ...
Jordan Canonical Form (JCF) is one of the most important, and useful, concepts in linear algebra. Th...
As a linear map, a derivation of a K-algebra can be decompoised into semi-simple part and nilpotent ...
AbstractIf the inverse of a square polynomial matrix L(s) is proper rational, then L(s)-1 can be wri...
AbstractWe treat the question of Jordan decomposition for R-orders, where R is an integrally closed ...
We treat the question of Jordan decomposition for R-orders, where R is an integrally closed noetheri...
We give a very short proof of the main result of J. Benitez, A new decomposition for square matrices...
Complex orthogonal matrices are orthogonal matrices with complex elements. Because the characterisat...