On Maximal Functions With Curvature

Abstract

We exhibit a class of "relatively curved" γ(t) := (γ1(t),…,γn(t)), so that the pertaining multi-linear maximal function satisfies the sharp range of H\"older exponents, \[ \| r > 0 \ 1r ∫0r Πi=1n |fi(x-γi(t))| \ dt \|Lp(R) ≤ C · Πi=1n \| fj \|Lpj(R) \] whenever 1p = Σj=1n 1pj, where pj > 1 and p ≥ pγ, where 1 ≥ pγ > 1/n for certain curves. For instance, pγ = 1/n+ for the case of fractional monomials, \[ γ(t) = (tα1,…,tαn), \; \; \; α1 < … < αn.\] Two sample applications of our method are as follows: For any measurable u1,…,un : Rn R, with ui independent of the ith coordinate vector, and any relatively curved γ, \[ r 0 \ 1r ∫0r F(x1 - u1(x) · γ1(t),…,xn - un(x) · γn(t) ) \ dt = F(x1,…,xn), \; \; \; a.e. \] for every F ∈ Lp(Rn), \ p > 1. Every appropriately normalized set A ⊂ [0,1] of sufficiently large Hausdorff dimension contains the progression, \[ \ x, x-γ1(t),…,x - γn(t) \ ⊂ A, \] for some t ≥ cγ > 0 strictly bounded away from zero, depending on γ.