The valence of harmonic polynomials viewed through the probabilistic lens

Abstract

We prove the existence of complex polynomials p(z) of degree n and q(z) of degree m<n such that the harmonic polynomial p(z) + q(z) has at least n m many zeros. This provides an array of new counterexamples to Wilmshurst's conjecture that the maximum valence of harmonic polynomials p(z)+q(z) taken over polynomials p of degree n and q of degree m is m(m-1)+3n-2. More broadly, these examples show that there does not exist a linear (in n) bound on the valence with a uniform (in m) growth rate. The proof of this result uses a probabilistic technique based on estimating the average number of zeros of a certain family of random harmonic polynomials.