Lp-improving bounds of maximal functions along planar curves

Abstract

In this paper, we study the Lp(R2)-improving bounds, i.e., Lp(R2)→ Lq(R2) estimates, of the maximal function Mγ along a plane curve (t,γ(t)), where Mγf(x1,x2):=u∈ [1,2]|∫01f(x1-ut,x2-u γ(t))\,dt|, and γ is a general plane curve satisfying some suitable smoothness and curvature conditions. We obtain Mγ : Lp(R2)→ Lq(R2) if (1p,1q)∈ \(0,0)\ and (1p,1q) satisfying 1+(1 +ω)(1q-1p)>0, where :=\(1p,1q):\ 12p<1q≤ 1p, 1q>3p-1 \ and ω:=t→ 0+|γ(t)| t. This result is sharp except for some borderline cases. As Hickman stated in [J. Funct. Anal. 270 (2016), pp. 560--608], this is a very different situation.