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Uniformly cyclic vectors

100%
Rosenblatt J.
Colloquium Mathematicum
|
2006
|
tom 104
|
nr 1
21-32
EN
A group acting on a measure space (X,β,λ) may or may not admit a cyclic vector in $L_{∞}(X)$. This can occur when the acting group is as big as the group of all measure-preserving transformations. But it does not occur, even though there is no cardinality obstruction to it, for the regular action of a group on itself. The connection of cyclic vectors to the uniqueness of invariant means is also discussed.
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Restricted continuity and a theorem of Luzin

63%
Ciesielski K., Rosenblatt J.
Colloquium Mathematicum
|
2014
|
tom 135
|
nr 2
211-225
EN
Let P(X,ℱ) denote the property: For every function f: X × ℝ → ℝ, if f(x,h(x)) is continuous for every h: X → ℝ from ℱ, then f is continuous. We investigate the assumptions of a theorem of Luzin, which states that P(ℝ,ℱ) holds for X = ℝ and ℱ being the class C(X) of all continuous functions from X to ℝ. The question for which topological spaces P(X,C(X)) holds was investigated by Dalbec. Here, we examine P(ℝⁿ,ℱ) for different families ℱ. In particular, we notice that P(ℝⁿ,"C¹") holds, where "C¹" is the family of all functions in C(ℝⁿ) having continuous directional derivatives allowing infinite values; and this result is the best possible, since P(ℝⁿ,D¹) is false, where D¹ is the family of all differentiable functions (no infinite derivatives allowed). We notice that if 𝓓 is the family of the graphs of functions from ℱ ⊆ C(X), then P(X,ℱ) is equivalent to the property P*(X,𝓓): For every f: X × ℝ → ℝ, if f↾ D is continuous for every D ∈ 𝓓, then f is continuous. Note that if 𝓓 is the family of all lines in ℝⁿ, then, for n ≥ 2, P*(ℝⁿ,𝓓) is false, since there are discontinuous linearly continuous functions on ℝⁿ. In this direction, we prove that there exists a Baire class 1 function h: ℝⁿ → ℝ such that P*(ℝⁿ,T(h)) holds, where T(H) stands for all possible translations of H ⊂ ℝⁿ × ℝ; and this result is the best possible, since P*(ℝⁿ,T(h)) is false for any h ∈ C(ℝⁿ). We also notice that P*(ℝⁿ,T(Z)) holds for any Borel Z ⊆ ℝⁿ × ℝ either of positive measure or of second category. Finally, we give an example of a perfect nowhere dense Z ⊆ ℝⁿ × ℝ of measure zero for which P*(ℝⁿ,T(Z)) holds.
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