Lp Boundedness of Hilbert Transforms Associated with Variable Plane Curves

Abstract

Let p∈ (1,∞). In this paper, for any given measurable function u:\ R→ R and a generalized plane curve γ satisfying some conditions, the Lp(R2) boundedness of the Hilbert transform along the variable plane curve u(x1)γ Hu,γf(x1,x2):=p.\,v.∫-∞∞f(x1-t,x2-u(x1)γ(t)) \,dtt, ∀\, (x1,x2)∈R2, is obtained. At the same time, the Lp(R) boundedness of the corresponding Carleson operator along the general curve γ Cu,γf(x):=p.\,v.∫-∞∞eiu(x)γ (t)f(x-t)\,dtt, ∀\, x∈R, is also obtained. Moreover, all the bounds are independent of the measurable function u.