Sharp function and weighted Lp estimates for pseudo-differential operators with symbols in general H\"ormander classes

Abstract

The purpose of this paper is to prove pointwise inequalities and to establish the boundedness on weighted Lp spaces for pseudo-differential operators Ta defined by the symbol a∈ Sm,δ with 0≤≤1, 0≤δ<1. Firstly, we prove that if m≤-n(1-)/2, then (Tau)(x) M(|u|2)1/2(x) for all x∈Rn and all Schwartz function u. Secondly, it is shown that if 1≤ r≤2 and m≤-nr(1-), then for any ω belongs to the class of Muckenhoupt weights Ap/r with r<p<∞, these operators are bounded on Lpω. Moreover, these results are sharp on the bound of m.