Characterizations of the multiple Littlewood--Paley operators on product domains

Commutators of Littlewood-Paley Operators on the Generalized Morrey Space

Littlewood-paley Theorem for Schrödinger Operators

Let H be a Schrödinger operator on R. Under a polynomial decay condition for the kernel of its spectral operator, we show that the Besov spaces and Triebel-Lizorkin spaces associated with H are well defined. We further give a Littlewood-Paley characterization of Lp spaces as well as Sobolev spaces in terms of dyadic functions of H . This generalizes and strengthens the previous result when the ...

On Pointwise Estimates for the Littlewood-paley Operators

In a recent paper we proved pointwise estimates relating some classical maximal and singular integral operators. Here we show that inequalities essentially of the same type hold for the Littlewood-Paley operators.

Singular Integrals and Littlewood–Paley Operators

We prove mixed Ap-Ar inequalities for several basic singular integrals, Littlewood–Paley operators, and the vector-valued maximal function. Our key point is that r can be taken arbitrarily big. Hence, such inequalities are close in spirit to those obtained recently in the works by T. Hytönen and C. Pérez, and M. Lacey. On one hand, the “Ap-A∞” constant in these works involves two independent su...

On Some Weighted Norm Inequalities for Littlewood–paley Operators

It is shown that the Lw,1< p<∞, operator norms of Littlewood–Paley operators are bounded by a multiple of ‖w‖ Ap , where γp = max{1, p/2} 1 p−1 . This improves previously known bounds for all p > 2. As a corollary, a new estimate in terms of ‖w‖Ap is obtained for the class of Calderón–Zygmund singular integrals commuting with dilations.