On the set of fixed points for NRS(m)

Abstract

Let f(z) be a degree d polynomial with zeros zi. For arbitrary m we construct explicit set of fixed points (attractors) of NRS(m), and prove a factored formula for the Jacobian at these points. We prove that if NRS(2), when applied to f with an arbitrary starting point, converges to a point (w0, w1), then w0 is of the form zi+zj for some i ≠ j. As a corollary, we prove a formula expressing the elementary symmetric expansion of the function \[ Π1≤ i < j ≤ d (z - zi -zj) \] in the variables zi in terms of non-intersecting paths on certain directed graphs, using the Lindstr\"om-Gessel-Veinnot Lemma.