Multilinear Littlewood-Paley-Stein Operators on Non-homogeneous Spaces

Abstract

Let 2, λ > 1 and define the multilinear Littlewood-Paley-Stein operators by gλ,μ*(f)(x) = (Rn+1+ t(x, y) |∫Rn st(y,z) Πi=1 fi(zi) \ dμ(zi)|2 dμ(y) dttm+1)12, where t(x, y)=(tt + |x - y|)m λ. In this paper, our main aim is to investigate the boundedness of gλ,μ* on non-homogeneous spaces. By means of probabilistic and dyadic techniques, together with non-homogeneous analysis, we show that gλ,μ* is bounded from Lp1(μ) × ·s × Lp(μ) to Lp(μ) under certain weak type assumptions. The multilinear non-convolution type kernels st only need to satisfy some weaker conditions than the standard conditions of multilinear Calder\'on-Zygmund type kernels and the measures μ are only assumed to be upper doubling measures (non-doubling). The above results are new even under Lebesgue measures. This was done by considering first a sufficient condition for the strong type boundedness of gλ,μ* based on an endpoint assumption, and then directly deduce the strong bound on a big piece from the weak type assumptions.