Title of article
Normal forms for general polynomial matrices
Author/Authors
Bernhard Beckermann، نويسنده , , George Labahn، نويسنده , , Gilles Villard، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2006
Pages
30
From page
708
To page
737
Abstract
We present an algorithm for the computation of a shifted Popov normal form of a rectangular polynomial matrix. For specific input shifts, we obtain methods for computing the matrix greatest common divisor of two matrix polynomials (in normal form) and procedures for such polynomial normal form computations as those of the classical Popov form and the Hermite normal form. The method involves embedding the problem of computing shifted forms into one of computing matrix rational approximants. This has the advantage of allowing for fraction-free computations over integral domains such as and .
In the case of rectangular matrix input, the corresponding multipliers for the shifted forms are not unique. We use the concept of minimal matrix approximants to introduce a notion of minimal multipliers and show how such multipliers are computed by our methods.
Keywords
Exact arithmetic , Matrix Gcd , Hermite normal form , Fraction-free algorithm , Popov normal form
Journal title
Journal of Symbolic Computation
Serial Year
2006
Journal title
Journal of Symbolic Computation
Record number
805939
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