Lower bounds on the measure of the support of positive and negative parts of trigonometric polynomials

Abstract

For a finite set of natural numbers D consider a complex polynomial of the form f(z) = Σd ∈ D cd zd. Let +(f) and -(f) be the fractions of the unit circle that f sends to the right(Re f(z) > 0) and left(Re f(z) < 0) half-planes, respectively. Note that Re f(z) is a real trigonometric polynomial, whose allowed set of frequencies is D. It turns out that (+(f), -(f)) is always bounded from below by a numerical characteristic α(D) of our set D which comes from a seemingly unrelated combinatorial problem. Furthermore, this result could be generalized to power series, almost periodic functions, functions of several variables and multivalued algebraic functions.