Lp-Lq estimates for maximal operators associated to families of finite type curves

Abstract

We study the boundedness problem for maximal operators M associated to averages along families of finite type curves in the plane, defined by Mf(x) \, := \, 1 ≤ t ≤ 2 |∫C f(x-ty) \, (y) \, dσ(y)|, where dσ denotes the normalised Lebesgue measure over the curves C. Let be the closed triangle with vertices P=(25, 15), ~ Q=(12, 12), ~ R=(0, 0). In this paper, we prove that for (1p, 1q) ∈ ( \P, Q\) \(1p, 1q) :q > m \, there is a constant B such that \|Mf\|Lq(R2) ≤ \, B \, \|f\|Lp(R2). Furthermore, if m <5, then we have \|Mf\|L5, ∞(R2) ≤ B \|f\|L52 ,1 (R2). We shall also consider a variable coefficient version of maximal theorem and we obtain the Lp-Lq boundedness result for (1p, 1q) ∈ \(1p, 1q) :q > m \, where is the interior of the triangle with vertices (0,0), ~(12, 12), ~(25, 15). An application is given to obtain Lp-Lq estimates for solution to higher order, strictly hyperbolic pseudo-differential operators.