Riesz transforms, Cauchy-Riemann systems and amalgam Hardy spaces

Abstract

In this paper we study Hardy spaces Hp,q(Rd), 0<p,q<∞, modeled over amalgam spaces (Lp,q)(Rd). We characterize Hp,q(Rd) by using first order classical Riesz transforms and compositions of first order Riesz transforms depending on the values of the exponents p and q. Also, we describe the distributions in Hp,q(Rd) as the boundary values of solutions of harmonic and caloric Cauchy-Riemann systems. We remark that caloric Cauchy-Riemann systems involve fractional derivative in the time variable. Finally we characterize the functions in L2(Rd) Hp,q(Rd) by means of Fourier multipliers mθ with symbol θ(·/|·|), where θ ∈ C∞(Sd-1) and Sd-1 denotes the unit sphere in Rd.