The maximal Beurling transform associated with squares

Abstract

It is known that the improved Cotlar's inequality B*f(z) C M(Bf)(z), z∈ C, holds for the Beurling transform B, the maximal Beurling transform B*f(z)= >0|∫|w|>f(z-w) 1w2 \,dw|, z∈ C, and the Hardy--Littlewood maximal operator M. In this note we consider the maximal Beurling transform associated with squares, namely, B*Sf(z)= >0|∫w Q(0,)f(z-w) 1w2 \,dw |, z∈ C, Q(0,) being the square with sides parallel to the coordinate axis of side length . We prove that BS*f(z) C M2(Bf)(z), z∈ C, where M2=M M is the iteration of the Hardy--Littlewood maximal operator, and M2 cannot be replaced by M.