The Zero Set of an Electrical Field from a Finite Number of Point Charges: One, Two, and Three Dimensions

Abstract

We study the structure of the zero set of a finite point charge electrical field F = (X,Y,Z) in R3. Indeed, mostly we focus on a finite point charge electrical field F =(X,Y) in R2. The well-known conjecture is that the zero set of F = (X,Y) is finite. We show that this is true in a Special Case: when the point charges for F = (X,Y) lie on a line. In addition, we give fairly complete structural information about the zero sets of X and Y for F = (X,Y) in the Special Case. A highlight of the paper states that in the Special Case the zero set of F = (X,Y) contains at most 9M24M points, where M is the number of point charges.

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