Add to ORKGTech ReportFinding polynomial roots rapidly and accurately is an important problem in many areas of signal processing. We present a new program which is a combination of Muller's and Newton's method. We use the former for computing a root of the deflated polynomial which is a good estimate for the root of the original polynomial. This estimate is improved by applying Newton's method to the original polynomial. Test polynomials up to the degree 10000 show the superiority of our program over the best methods to our knowledge regarding speed and accuracy, i.e., Jenkins/Traub program and the eigenvalue method. Furthermore we give a simple approach to improve the accuracy for spectral factorization in the case there are double roots on the uni...
(Supported by NSF Grant CCF 1116736) Abstract. Univariate polynomial root-finding is both classical ...
. Aberth's method for finding the roots of a polynomial was shown to be robust. However, compl...
summary:In this paper the method for simultaneous finding of all the roots of a polynomial is derive...
In this lecture we will propose a new fast and stable manner of computing roots of polynomials. Root...
The place of numerical approaches in determining the roots of polynomials cannot be overlooked. This...
AbstractMatrix methods are increasingly popular for polynomial root-finding. The idea is to approxim...
Matrix methods are increasingly popular for polynomial root-finding. The idea is to approxi-mate the...
A stable algorithm to compute the roots of polynomials is presented. The roots are found by computin...
AbstractA new algorithm for computing all roots of polynomials with real coefficients is introduced....
AbstractWe derive a local geometric property of an analytic function ƒ, and, in the case where ƒ is ...
AbstractThis paper considers structured matrix methods for the calculation of the theoretically exac...
© 2014 IEEE. This paper describes a new parallel polynomial rooting technique for root-MUSIC suitabl...
© 2015 Society for Industrial and Applied Mathematics. A stable algorithm to compute the roots of po...
AbstractTo approximate all roots (zeros) of a univariate polynomial, we develop two effective algori...
A stable algorithm to compute the roots of polynomials is presented. The roots are found by computin...
(Supported by NSF Grant CCF 1116736) Abstract. Univariate polynomial root-finding is both classical ...
. Aberth's method for finding the roots of a polynomial was shown to be robust. However, compl...
summary:In this paper the method for simultaneous finding of all the roots of a polynomial is derive...
In this lecture we will propose a new fast and stable manner of computing roots of polynomials. Root...
The place of numerical approaches in determining the roots of polynomials cannot be overlooked. This...
AbstractMatrix methods are increasingly popular for polynomial root-finding. The idea is to approxim...
Matrix methods are increasingly popular for polynomial root-finding. The idea is to approxi-mate the...
A stable algorithm to compute the roots of polynomials is presented. The roots are found by computin...
AbstractA new algorithm for computing all roots of polynomials with real coefficients is introduced....
AbstractWe derive a local geometric property of an analytic function ƒ, and, in the case where ƒ is ...
AbstractThis paper considers structured matrix methods for the calculation of the theoretically exac...
© 2014 IEEE. This paper describes a new parallel polynomial rooting technique for root-MUSIC suitabl...
© 2015 Society for Industrial and Applied Mathematics. A stable algorithm to compute the roots of po...
AbstractTo approximate all roots (zeros) of a univariate polynomial, we develop two effective algori...
A stable algorithm to compute the roots of polynomials is presented. The roots are found by computin...
(Supported by NSF Grant CCF 1116736) Abstract. Univariate polynomial root-finding is both classical ...
. Aberth's method for finding the roots of a polynomial was shown to be robust. However, compl...
summary:In this paper the method for simultaneous finding of all the roots of a polynomial is derive...