Thesis (M. Eng.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer Science, 2007.Includes bibliographical references (p. 71-72).Shirayanagi and Sweedler [12] proved that a large class of algorithms on the reals can be modified slightly so that they also work correctly on floating-point numbers. Their main theorem states that, for each input, there exists a precision, called the minimum converging precision (MCP), at and beyond which the modified "stabilized" algorithm follows the same sequence of steps as the original "exact" algorithm. In this thesis, we study the MCP of two algorithms for finding the greatest common divisor of two univariate polynomials with real coefficients: the Euclidean algorithm, an...
We analyse the behaviour of the Euclidean algorithm applied to pairs (g,f) of univariate nonconstant...
summary:The paper introduces the calculation of a greatest common divisor of two univariate polynomi...
The polynomial time algorithm of Lenstra, Lenstra, and Lovász [15] for factoring integer polynomials...
AbstractIn this paper, we consider computations involving polynomials with inexact coefficients, i.e...
AbstractWe study the approximate GCD of two univariate polynomials given with limited accuracy or, e...
AbstractIn this paper we provide a fast, numerically stable algorithm to determine when two given po...
This paper analyzes the Euclidean algorithm and some variants of it for computingthe greatest common...
Computing polynomial greatest common divisors (GCD) plays an important role in Computer Algebra syst...
Computing the greatest common divisor (GCD) for two polynomials in floating point arithmetic is comp...
AbstractWe describe two algorithms of approximate GCD (greatest common divisor) for polynomials with...
This paper considers the computation of the degree t of an approximate greatest common divisor d(y)...
We present an iterative algorithm for calculating approximate greatest common divisor (GCD) of univa...
Title: Approximate Polynomial Greatest Common Divisor Author: Ján Eliaš Department: Department of Nu...
Curve and surface intersection finding is a fundamental problem in computer-aided geometric design (...
AbstractWe present some results on approximate GCD for univariate polynomials: given n polynomials P...
We analyse the behaviour of the Euclidean algorithm applied to pairs (g,f) of univariate nonconstant...
summary:The paper introduces the calculation of a greatest common divisor of two univariate polynomi...
The polynomial time algorithm of Lenstra, Lenstra, and Lovász [15] for factoring integer polynomials...
AbstractIn this paper, we consider computations involving polynomials with inexact coefficients, i.e...
AbstractWe study the approximate GCD of two univariate polynomials given with limited accuracy or, e...
AbstractIn this paper we provide a fast, numerically stable algorithm to determine when two given po...
This paper analyzes the Euclidean algorithm and some variants of it for computingthe greatest common...
Computing polynomial greatest common divisors (GCD) plays an important role in Computer Algebra syst...
Computing the greatest common divisor (GCD) for two polynomials in floating point arithmetic is comp...
AbstractWe describe two algorithms of approximate GCD (greatest common divisor) for polynomials with...
This paper considers the computation of the degree t of an approximate greatest common divisor d(y)...
We present an iterative algorithm for calculating approximate greatest common divisor (GCD) of univa...
Title: Approximate Polynomial Greatest Common Divisor Author: Ján Eliaš Department: Department of Nu...
Curve and surface intersection finding is a fundamental problem in computer-aided geometric design (...
AbstractWe present some results on approximate GCD for univariate polynomials: given n polynomials P...
We analyse the behaviour of the Euclidean algorithm applied to pairs (g,f) of univariate nonconstant...
summary:The paper introduces the calculation of a greatest common divisor of two univariate polynomi...
The polynomial time algorithm of Lenstra, Lenstra, and Lovász [15] for factoring integer polynomials...