Carlson's theorem

Statement of theorem

Assume that f satisfies the following three conditions: the first two conditions bound the growth of f at infinity, whereas the third one states that f vanishes on the non-negative integers.

Then f is identically zero.

First condition

The first condition may be relaxed: it is enough to assume that f is analytic in Re z > 0, continuous in Re z ≥ 0, and satisfies

for some real values C, τ.

Second condition

To see that the second condition is sharp, consider the function f(z) = sin(πz). It vanishes on the integers; however, it grows exponentially on the imaginary axis with a growth rate of c = π, and indeed it is not identically zero.

Third condition

A result, due to Rubel (1956), relaxes the condition that f vanish on the integers. Namely, Rubel showed that the conclusion of the theorem remains valid if f vanishes on a subset A ⊂ {0, 1, 2, …} of upper density 1, meaning that

This condition is sharp, meaning that the theorem fails for sets A of upper density smaller than 1.

Applications

Suppose f(z) is a function that possess all finite forward differences Δ n f ( 0 ) . Consider then the Newton series

with ( z n ) is the binomial coefficient and Δ n f ( 0 ) is the n-th forward difference. By construction, one then has that f(k) = g(k) for all non-negative integers k, so that the difference h(k) = f(k) − g(k) = 0. This is one of the conditions of Carlson's theorem; if h obeys the others, then h is identically zero, and the finite differences for f uniquely determine its Newton series. That is, if a Newton series for f exists, and the difference satisfies the Carlson conditions, then f is unique.