Convergence of Fourier series at or beyond endpoint

Abstract

We consider several problems at or beyond endpoint in harmonic analysis. The solutions of these problems are related to the estimates of some classes of sublinear operators. To do this, we introduce some new functions spaces RLp,s|x|α( Rn) and RLp,s|x|α( Rn), which play an analogue role with the classical Hardy spaces Hp( Rn). These spaces are subspaces of Lp|x|α( Rn) with 1<s<∞, 0<p≤ s and -n<α<n(p-1), and RLp,s|x|α( Rn) ⊃ Ls( Rn) when -n<α<n(p/s-1). We prove the following results. First, μα-a.e. convergence and Lp|x|α( R) -norm convergence of Fourier series hold for all functions in RLp,s|x|α( R) and RLp,s|x|α( R) with 1<s<∞, 0<p≤ s and -1<α<p-1, where μα(x)=|x|α; Second, many sublinear operators initially defined for the functions in Lp( Rn) with 1<p<∞, such as Calder\'on-Zygmund operators, C.Fefferman's singular multiplier operator, R.Fefferman's singular integral operator, the Bochner-Riesz means at the critical index, certain oscillatory singular integral operators, and so on, admit extensions which map RLp,s|x|α( Rn) and RLp,s|x|α( Rn) into Lp|x|α( Rn) with 1<s<∞, 0<p≤ s and -n<α<n(p-1); Final, Hardy-Littlewood maximal operator is bounded from RLp,s|x|α( Rn) (or RLp,s|x|α( Rn)) to Lp|x|α( Rn) for 1<s<∞ and 0<p≤ s if and only if -n<α<n(p-1).