The maximum modulus set of a polynomial

Abstract

We study the maximum modulus set, M(p), of a polynomial p. We are interested in constructing p so that M(p) has certain exceptional features. Jassim and London gave a cubic polynomial p such that M(p) has one discontinuity, and Tyler found a quintic polynomial p such that M(p) has one singleton component. These are the only results of this type, and we strengthen them considerably. In particular, given a finite sequence a1, a2, …, an of distinct positive real numbers, we construct polynomials p and p such that M(p) has discontinuities of modulus a1, a2, …, an, and M(p) has singleton components at the points a1, a2, …, an. Finally we show that these results are strong, in the sense that it is not possible for a polynomial to have infinitely many discontinuities in its maximum modulus set.