Single annulus estimates for the variation-norm Hilbert transforms along Lipschitz vector fields

Guo, Shaoming

doi:10.1090/proc/13277

Single annulus estimates for the variation-norm Hilbert transforms along Lipschitz vector fields
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Proc. Amer. Math. Soc. 145 (2017), 601-615 Request permission

Abstract:

Let $v$ be a planar Lipschitz vector field. We prove that the $r$-th variation-norm Hilbert transform along $v$ (defined as in (1.8)), composed with a standard Littlewood-Paley projection operator $P_k$, is bounded from $L^2$ to $L^{2, \infty }$, and from $L^p$ to itself for all $p>2$. Here $r>2$ and the operator norm is independent of $k\in \mathbb {Z}$. This generalises Lacey and Li’s result (2006) for the case of the Hilbert transform. However, their result only assumes measurability for vector fields. In contrast to that, we need to assume vector fields to be Lipschitz.

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