Newton flows for elliptic functions III Classification of 3rd order Newton graphs

Abstract

A Newton graph of order r( ≥slant 2) is a cellularly embedded toroidal graph on r vertices, 2r edges and r faces that fulfils certain combinatorial properties (Euler, Hall). The significance of these graphs relies on their role in the study of structurally stable elliptic Newton flows - say N (f) - of order r, i.e. desingularized continuous versions of Newton's iteration method for finding zeros for an elliptic function f (of order r). In previous work we established a representation of these flows in terms of Newton graphs. The present paper results into the classification of all 3rd order Newton graphs, implying a list of all nine possible 3rd order flows N (f) (up to conjugacy and duality).