A Dunkl–Williams type inequality for absolute value operators

We prove very general weighted norm inequalities for rough maximal and singular integral operators whose kernels satisfy some common Fourier transform decay estimates. Examples include homogeneous singular integral operators with kernels which do not necessarily satisfy a Dini condition as well as s

It is well-known that, by applying standard inequalities to functions with values in an appropriate Banach space, the applicability of these inequalities can often be usefully extended. For this reason, it is noteworthy that, whereas M. Riesz' original proof of his well-known inequality for the

The purpose of this paper is to consider a class of p-degenerate subelliptic operators Lp constructed by generalizing Greiner's vector ÿelds. Their fundamental solutions at the origin are established with the aid of the properties of radial functions. A Picone-type identity and a Hardy-type inequali