Characterization of Sobolev spaces on the sphere

Abstract

We prove a characterization of the Sobolev spaces Hα on the unit sphere Sd-1, where the smoothness index α is any positive real number and d≥ 2. This characterization does not use differentiation and it is given in terms of ([α/2]+1)-multidimensional square functions Sα. For [α/2]=0, a function f∈ L2(Sd-1) belongs to Hα(Sd-1) if and only if Sα (f)∈ L2(Sd-1). If n=[α/2]>0, the membership of f is equivalent to the existence of g1,·s,gn in L2(Sd-1) such that Sα(f,g1,…,gn)∈ L2(Sd-1) and in this case, gj=Tj((-S)j f), where Tj is a zonal Fourier multiplier in the sphere and S is the Laplace-Beltrami operator. The square functions Sα are based on averaging operators over euclidean balls (caps) in the sphere that may be viewed as zonal multipliers. The results in the paper are in the spirit of the characterization of fractional Sobolev spaces given in Rd proved in AMV. The development of the theory is fully based on zonal Fourier multipliers and special functions.