Boundedness properties of maximal operators on Lorentz spaces

Abstract

We study mapping properties of the centered Hardy--Littlewood maximal operator M acting on Lorentz spaces. Given p ∈ (1,∞) and a metric measure space X we let p HL(X) ⊂ [0,1]2 be the set of all pairs (1q,1r) such that M is bounded from Lp,q(X) to Lp,r(X). For each fixed p all possible shapes of p HL(X) are characterized. Namely, we show that the boundary of p HL(X) either is empty or takes the form \ δ \ × [0, u → δ F(u)] \ \ \(u, F(u)) : u ∈ (δ, 1] \, where δ ∈ [0,1] and F [δ, 1] → [0,1] is concave, non-decreasing, and satisfying F(u) ≤ u. Conversely, for each such F we find X such that M is bounded from Lp,q(X) to Lp,r(X) if and only if the point (1q, 1r) lies on or under the graph of F, that is, 1q ≥ δ and 1r ≤ F(1q).