Fractional type operators on Hardy spaces associated with ball quasi-Banach function spaces

Abstract

For 0 ≤ α < n and m ∈ N (1 - αn, +∞ ), we consider certain fractional type operators Tα, m generated by m-orthogonal matrices and prove that, for 0 < α < n, Tα, m can be extended to a bounded operator HX Y and, for α = 0, T0, m can be extended to a bounded operator HX X, where X and Y are certain ball quasi-Banach spaces related to each other and HX is the Hardy space associated with X. In particular, our results apply to weighted Lebesgue spaces, variable Lebesgue spaces, Lorentz spaces and Orlicz spaces, the last two are new. Our proofs rely on the ssumption that X is O(n)-invariant, the theory of weighted Hardy spaces, the Rubio de Francia iteration algorithm and the finite atomic decomposition of HX.