Quantitative weighted bounds for the q-variation of singular integrals with rough kernels

Abstract

In this paper, we study the quantitative weighted bounds for the q-variational singular integral operators with rough kernels. The main result is for the sharp truncated singular integrals itself \|Vq\T,\>0\|Lp(w)→ Lp(w)≤ cp,q,n \|\| L∞(w)Ap1+1/q\w\Ap, where the quantity (w)Ap, \w\Ap will be recalled in the introduction; we do not know whether this is sharp, but it is the best known quantitative result for this class of operators, since when q=∞, it coincides with the best known quantitative bounds by Di Pilino--Hyt\"onen--Li or Lerner. In the course of establishing the above estimate, we obtain several quantitative weighted bounds which are of independent interest. We hereby highlight two of them. The first one is \|Vq\φk T\k∈ Z\|Lp(w)→ Lp(w)≤ cp,q,n \|\| L∞(w)Ap1+1/q\w\Ap, where φk(x)=12knφ( x2k) with φ∈ C∞c( Rn) being any non-negative radial function, and the sharpness for q=∞ is due to Lerner; the second one is \|Sq\T,\>0\|Lp(w)→ Lp(w)≤ cp,q,n \|\| L∞(w)Ap1/q\w\Ap, and the sharpness for q=∞ follows from the Hardy--Littlewood maximal function.