The polyhedral type of a polynomial map on the plane

Abstract

Two continuous maps f, g : C22 are said to be topologically equivalent if there exist homeomorphisms ,:C22 satisfying f = g. It is known that there are finitely many topologically non-equivalent polynomial maps C22 with any given degree d. The number T(d) of these topological types is known only whenever d=2. In this paper, we describe the topology of generic complex polynomial maps on the plane using the corresponding pair of Newton polytopes and establish a method for constructing topologically non-equivalent maps of degree d. We furthermore provide a software implementation of the resulting algorithm, and present lower bounds on T(d) whenever d=3 and d=4.