Lp maximal bound and Sobolev regularity of two-parameter averages over tori

Abstract

We investigate Lp boundedness of the maximal function defined by the averaging operator f Ats f over the two-parameter family of tori Tts:=\ ( (t+sθ)φ,\,(t+sθ)φ,\, sθ ): θ, φ ∈ [0,2π) \ with c0t>s>0 for some c0∈ (0,1). We prove that the associated (two-parameter) maximal function is bounded on Lp if and only if p>2. We also obtain Lp--Lq estimates for the local maximal operator on a sharp range of p,q. Furthermore, the sharp smoothing estimates are proved including the sharp local smoothing estimates for the operators f Ats f and f Atc0t f. For the purpose, we make use of Bourgain--Demeter's decoupling inequality for the cone and Guth--Wang--Zhang's local smoothing estimates for the 2 dimensional wave operator.