Discrete para-product operators on variable Hardy spaces

Abstract

Let p(·): Rn→(0,∞) be a variable exponent function satisfying the globally log-H\"older continuous condition. In this paper, we obtain the boundedness of para-product operators πb on variable Hardy spaces Hp(·)( Rn), where b∈ BMO( Rn). As an application, we show that non-convolution type Calder\'on-Zygmund operators T are bounded on Hp(·)( Rn) if and only if T1=0, where nn+ε<essinfx∈ Rn p esssupx∈ Rn p 1, ε is the regular exponent of kernel of T. Our approach relies on the discrete version of Calder\'on's reproducing formula, discrete Littlewood-Paley-Stein theory and almost orthogonal estimates. These results still hold for variable Hardy space on spaces of homogeneous type by using our methods.