Karl F. Barth¹ and David A. Brannan²

Copyright © 1996 Karl F. Barth and David A. Brannan. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

A tract (or asymptotic tract) of a real function u harmonic and nonconstant in the complex plane 𝒞 is one of the nc components of the set {z:u(z)≠c}, and the order of a tract is the number of non-homotopic curves from any given point to ∞ in the tract. The authors prove that if u(z) is an entire harmonic polynomial of degree n, if the critical points of any of its analytic completions f lie on the level sets τj={z:u(z)=cj}, where 1≤j≤p and p≤n−1, and if the total order of all the critical points of f on τj is denoted by σj, then {nc:c∈ℜ}={n+1}∪{n+1+σj:1≤j≤p}.