Zeros of analytic functions, with or without multiplicities

Abstract

The classical Mason-Stothers theorem deals with nontrivial polynomial solutions to the equation a+b=c. It provides a lower bound on the number of distinct zeros of the polynomial abc in terms of the degrees of a, b and c. We extend this to general analytic functions living on a reasonable bounded domain ⊂ C, rather than on the whole of C. The estimates obtained are sharp, for any , and a generalization of the original result on polynomials can be recovered from them by a limiting argument.