Weak type inequalities for maximal operators associated to double ergodic sums.
It is shown that if T is a sublinear translation invariant operator of restricted weak type (1,1) acting on L¹(𝕋), then T maps simple functions in L log L(𝕋) boundedly into L¹(𝕋).
Let denote the strong maximal operator. Let and denote the one-dimensional Hardy-Littlewood maximal operators in the horizontal and vertical directions in ℝ². A function h supported on the unit square Q = [0,1]×[0,1] is exhibited such that but . It is shown that if f is a function supported on Q such that but , then there exists a set A of finite measure in ℝ² such that .
A necessary and sufficient condition is given on the basis of a rare maximal function such that implies f ∈ L log L([0,1]).
It is shown that if two functions share the same uncentered (two-sided) ergodic maximal function, then they are equal almost everywhere.
Let be a collection of bounded open sets in ℝⁿ such that, for any x ∈ ℝⁿ, there exists a set U ∈ of arbitrarily small diameter containing x. The collection is said to be a density basis provided that, given a measurable set A ⊂ ℝⁿ, for a.e. x ∈ ℝⁿ we have for any sequence of sets in containing x whose diameters tend to 0. The geometric maximal operator associated to is defined on L¹(ℝⁿ) by . The halo function ϕ of is defined on (1,∞) by and on [0,1] by ϕ(u) = u. It is shown that the halo...
Let be a non-periodic collection of commuting measure preserving transformations on a probability space (Ω,Σ,μ). Also let Γ be a nonempty subset of and the associated collection of rectangular parallelepipeds in with sides parallel to the axes and dimensions of the form with The associated multiparameter geometric and ergodic maximal operators and are defined respectively on and L¹(Ω) by and . Given a Young function Φ, it is shown that satisfies the weak type estimate for...
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