Computational and graphical results on a root‐finding method for a 7th‐deg Chebyshev polynomial in the complex plane C are presented. Level sets for sup{‖Hnζ0@B:n=1,2,...} reveal a visually striking and intricate class of patterns indicating behavior ranging from stable points to chaos. ‘‘Chaotic shattering’’ of the level sets is illustrated as the relaxation coefficient increases.

This content is only available via PDF.
You do not currently have access to this content.