Quantitative BMO-BLO Estimates for the Hardy-Littlewood Maximal Function

Abstract

In this note, we study a quantitative extension of the John-Nirenberg inequality for the Hardy-Littlewood maximal function of a BMO function. More precisely, for every nonconstant locally integrable function f such that Mf is not identically infinite, we prove the inequality equation* ( 1w(Q)∫Q ( Mf(x) - ess\,infQ Mf M\# f(x) )p w(x)\,dx)1p cn \, [w]A∞\, p equation* for every cube Q, every 1 p<∞ and every weight w∈ A∞, where [w]A∞ denotes the Fujii-Wilson A∞ constant. This result extends the classical boundedness \|Mf\|BLO Cn\|f\|BMO proved by Bennett, DeVore, and Sharpley (Ann. of Math. (2) 113 (1981)) and by Bennett (Proc. Amer. Math. Soc. 85 (1982)). Furthermore, we show that the class A∞ is both necessary and sufficient for this inequality to hold, providing a new characterization of A∞ in terms of the action of the maximal operator on bounded oscillation spaces.

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