Title :
Efficient parallel rooting of complex polynomials on the unit circle
Author :
McCormick, William S. ; Lansford, James L.
Author_Institution :
Wright State Univ., Dayton, OH, USA
fDate :
10/1/1991 12:00:00 AM
Abstract :
An efficient method is presented for rooting complex polynomial equations of any order where the root space is restricted to the unit circle. The method restates the evaluation of polynomials as a recursive algorithm involving only additions. By means of the bilinear transformation, the straight line, uniformly spaced, recursive polynomials evaluation method of A.H. Nuttall (1987) is extended to the unit circle where the root positions are determined by thresholding. General coefficient transformations are provided along with a comparison to the Horner method
Keywords :
polynomials; signal processing; Horner method; bilinear transformation; coefficient transformations; complex polynomials; efficient method; parallel rooting; recursive algorithm; thresholding; unit circle; Convergence of numerical methods; Equations; Finite difference methods; Frequency estimation; Iterative algorithms; Iterative methods; Numerical models; Polynomials; Radar; Silicon compounds;
Journal_Title :
Signal Processing, IEEE Transactions on
