The Sharp Constant in the Weak (1,1) Inequality for the Square Function: A New Proof

Abstract

In this note we give a new proof of the sharp constant C = e-1/2 + ∫01 e-x2/2\,dx in the weak (1, 1) inequality for the dyadic square function. The proof makes use of two Bellman functions L and M related to the problem, and relies on certain relationships between L and M, as well as the boundary values of these functions, which we find explicitly. Moreover, these Bellman functions exhibit an interesting behavior: the boundary solution for M yields the optimal obstacle condition for L, and vice versa.