Asymptotic Directions for the Zero Sets of the Components of an Electrical Field from a Finite Number of Point Charges on the Plane Part II

Abstract

We study the structure of the zero set of a nontrivial finite point charge electrical field F = (X,Y) in the plane R2. We establish equations satisfied by the possible directions for the zero sets \X = 0\ and \Y = 0\ separately, and we show that there are only finitely many possible asymptotic directions for both of these zero sets. We suspect that the set of asymptotic directions for \X = 0\ and the set of asymptotic directions for \Y = 0\ are (essentially) distinct.