Title :
QR factoring to compute the GCD of univariate approximate polynomials
Author :
Corless, Robert M. ; Watt, Stephen M. ; Zhi, Lihong
Author_Institution :
Ontario Res. Centre for Comput. Algebra, Univ. of Western Ontario, London, Ont., Canada
Abstract :
We present a stable and practical algorithm that uses QR factors of the Sylvester matrix to compute the greatest common divisor (GCD) of univariate approximate polynomials over R[x] or C[x]. An approximate polynomial is a polynomial with coefficients that are not known with certainty. The algorithm of this paper improves over previously published algorithms by handling the case when common roots are near to or outside the unit circle, by splitting and reversal if necessary. The algorithm has been tested on thousands of examples, including pairs of polynomials of up to degree 1000, and is now distributed as the program QRGCD in the SNAP package of Maple 9.
Keywords :
graph theory; matrix algebra; polynomial approximation; Maple 9; QR factoring; SNAP package; Sylvester matrix; greatest common divisor; program QRGCD; univariate approximate polynomial; Adaptive control; Algebra; Computational efficiency; Gaussian processes; Mathematical model; Packaging; Polynomials; Stability; Testing; 65; Greatest common divisor; Sylvester matrix;
Journal_Title :
Signal Processing, IEEE Transactions on
DOI :
10.1109/TSP.2004.837413
