A Rigidity Phenomenon for the Hardy-Littlewood Maximal Function

Abstract

The Hardy-Littlewood maximal function M and the trigonometric function x are two central objects in harmonic analysis. We prove that M characterizes x in the following way: let f ∈ Cα(R, R) be a periodic function and α > 1/2. If there exists a real number 0 < γ < ∞ such that the averaging operator (Axf)(r) = 12r∫x-rx+rf(z)dz has a critical point in r = γ for every x ∈ R, then f(x) = a+b(cx + d) for some~a,b,c,d ∈ R. This statement can be used to derive a characterization of trigonometric functions as those nonconstant functions for which the computation of the maximal function M is as simple as possible. The proof uses the Lindemann-Weierstrass theorem from transcendental number theory.