Weighted BMO-BLO estimates for Littlewood--Paley square operators
Abstract
Let T(f) denote the Littlewood--Paley square operators, including the Littlewood--Paley G-function G(f), Lusin's area integral S(f) and Stein's function Gλ(f) with λ>2. We establish the boundedness of Littlewood--Paley square operators on the weighted spaces BMO(ω) with ω∈ A1. The weighted space BLO(ω) (the space of functions with bounded lower oscillation) is introduced and studied in this paper. This new space is a proper subspace of BMO(ω). It is proved that if T(f)(x0) is finite for a single point x0∈ Rn, then T(f)(x) is finite almost everywhere in Rn. Moreover, it is shown that T(f) is bounded from BMO(ω) into BLO(ω), provided that ω∈ A1. The corresponding John--Nirenberg inequality suitable for the space BLO(ω) with ω∈ A1 is discussed. Based on this, the equivalent characterization of the space BLO(ω) is also given.
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