In this paper we give formulas for performing row reduction of a matrix of Ore polynomials in a fraction-free way. The reductions can be used for finding the rank and left nullspace of such matrices. When specialized to matrices of skew polynomials our reduction can be used for computing a weak Popov form of such matrices and for computing a GCRD and an LCLM of skew polynomials or matrices of skew polynomials. The algorithm is suitable for computation in exact arithmetic domains where the growth of coefficients in intermediate computations is a concern. This coefficient growth is controlled by using fraction-free methods. The known factor can be predicted and removed efficiently.
We reduce the problem of computing the rank and a null-space basis of a univariate polynomial matrix...
AbstractWe present an algorithm for the computation of a shifted Popov normal form of a rectangular ...
This thesis gives a deterministic algorithm to transform a row reduced matrix to canon- ical Popov ...
In this paper we give formulas for performing row reduction of a matrix of Ore polynomials in a fra...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
We show that the computation of the Popov form of Ore polyno-mial matrices can be formulated as a pr...
We show that the computation of the Popov form of Ore polyno-mial matrices can be formulated as a pr...
A new algorithm is presented for computing a column reduced form of a given full column rank polynom...
AbstractA simple algorithm for lattice reduction of polynomial matrices is described and analysed. T...
AbstractWe give modular algorithms to compute row-reduced forms, weak Popov forms, and Popov forms o...
We give modular algorithms to compute row-reduced forms, weak Popov forms, and Popov forms of polyno...
Recently an algorithm has been developed for column reduction of polynomial matrices. In a previous ...
Abstract. The subresultant theory for univariate commutative polynomials is generalized to Ore polyn...
Recently an algorithm has been developed for column reduction of polynomial matrices. In a previous ...
Introduction Recently Beelen developed an algorithm, called KERPOL, to detennine a minimal basis for...
We reduce the problem of computing the rank and a null-space basis of a univariate polynomial matrix...
AbstractWe present an algorithm for the computation of a shifted Popov normal form of a rectangular ...
This thesis gives a deterministic algorithm to transform a row reduced matrix to canon- ical Popov ...
In this paper we give formulas for performing row reduction of a matrix of Ore polynomials in a fra...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
We show that the computation of the Popov form of Ore polyno-mial matrices can be formulated as a pr...
We show that the computation of the Popov form of Ore polyno-mial matrices can be formulated as a pr...
A new algorithm is presented for computing a column reduced form of a given full column rank polynom...
AbstractA simple algorithm for lattice reduction of polynomial matrices is described and analysed. T...
AbstractWe give modular algorithms to compute row-reduced forms, weak Popov forms, and Popov forms o...
We give modular algorithms to compute row-reduced forms, weak Popov forms, and Popov forms of polyno...
Recently an algorithm has been developed for column reduction of polynomial matrices. In a previous ...
Abstract. The subresultant theory for univariate commutative polynomials is generalized to Ore polyn...
Recently an algorithm has been developed for column reduction of polynomial matrices. In a previous ...
Introduction Recently Beelen developed an algorithm, called KERPOL, to detennine a minimal basis for...
We reduce the problem of computing the rank and a null-space basis of a univariate polynomial matrix...
AbstractWe present an algorithm for the computation of a shifted Popov normal form of a rectangular ...
This thesis gives a deterministic algorithm to transform a row reduced matrix to canon- ical Popov ...