Abstract: The root-finding problem of non-linear equations has wide applications in computer aided geometric design,computer graphics,robotics,etc.This paper presented a reparameterization-based cubic clipping method for finding the roots of a non-linear equation. Firstly,it computes a cubic polynomial interpolating the given smooth function f(t) at four points.Then,it searches two reparameterization functions so that the reparameterized functions have the same derivatives,which leads to higher approximation order and convergence rate.Compared with the prevailing cubic clipping methods,the new method can achieve the convergence rate 9 or higher for single root cases,and directly bound the root without computing the bounding polynomials.Numerical examples show that it can converge to the proper solution even in some cases that Newton’s methods fail.

Key words: Root-finding of non-linear equations,Reparameterization,Cubic clipping,Convergence rate