On intersection of lemniscates of rational functions

Abstract

For a non-constant complex rational function P, the lemniscate of P is defined as the set of points z∈ C such that P(z) =1. The lemniscate of P coincides with the set of real points of the algebraic curve given by the equation LP(x,y)=0, where LP(x,y) is the numerator of the rational function P(x+iy) P(x-iy)-1. In this paper, we study the following two questions: under what conditions two lemniscates have a common component, and under what conditions the algebraic curve LP(x,y)=0 is irreducible. In particular, we provide a sharp bound for the number of complex solutions of the system P1(z) = P2(z) =1, where P1 and P2 are rational functions.