Sharp Weak Type Estimates for a Family of Zygmund Bases
Abstract
Let B be a collection of rectangular parallelepipeds in R3 whose sides are parallel to the coordinate axes and such that B consists of parallelepipeds with side lengths of the form s, 2j s, t , where s, t > 0 and j lies in a nonempty subset S of the integers. In this paper, we prove the following: If S is a finite set, then the associated geometric maximal operator MB satisfies the weak type estimate of the form |\x ∈ R3 : MBf(x) > α\| ≤ C ∫R3 |f|α(1 + + |f|α)\; but does not satisfy an estimate of the form |\x ∈ R3 : MBf(x) > α\| ≤ C ∫R3 φ(|f|α) for any convex increasing function φ: [0, ∞) → [0, ∞) satisfying the condition x → ∞φ(x)x ((1 + x)) = 0\;. On the other hand, if S is an infinite set, then the associated geometric maximal operator MB satisfies the weak type estimate |\x ∈ R3 : MBf(x) > α\| ≤ C ∫R3 |f|α (1 + + |f|α)2 but does not satisfy an estimate of the form |\x ∈ R3 : MBf(x) > α\| ≤ C ∫R3 φ(|f|α) for any convex increasing function φ: [0, ∞) → [0, ∞) satisfying the condition x → ∞φ(x)x ((1 + x))2 = 0\;.
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