Maximal operators and Hilbert transforms along variable non-flat homogeneous curves

Abstract

We prove that the maximal operator associated with variable homogeneous planar curves (t, u tα)t∈ R, α=1 positive, is bounded on Lp(R2) for each p>1, under the assumption that u:R2 R is a Lipschitz function. Furthermore, we prove that the Hilbert transform associated with (t, utα)t∈ R, α=1 positive, is bounded on Lp(R2) for each p>1, under the assumption that u:R2 R is a measurable function and is constant in the second variable. Our proofs rely on stationary phase methods, TT* arguments, local smoothing estimates and a pointwise estimate for taking averages along curves.