On exact atomless Milutin maps

Ageev, S. M.; Tymchatyn, E. D.

doi:10.1016/j.topol.2003.07.021

Cited by 16 publications

(20 citation statements)

References 5 publications

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“…Suppose β n = β for every n ∈ N. Since all the functions g n and g have the same domain and their graphs converge in the Hausdorff metric, we conclude that {g n } converges pointwise to g on dom g (see [9]). Then the sequence {g n • π 1 • ϕ} and the limit function g • π 1 • ϕ satisfy the hypothesis of Lebesgue's dominated convergence theorem and we obtain e(g n )(x n ) = e(g n )(x) → e(g)(x).…”

Section: Lemma 35mentioning

confidence: 84%

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Continuous linear extension of functions

Koyama

Stasyuk

Tymchatyn

et al. 2010

Proc. Amer. Math. Soc.

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Abstract. Let (X, d) be a complete metric space. We prove that there is a continuous, linear, regular extension operator from the space C * b of all partial, continuous, real-valued, bounded functions with closed, bounded domains in X to the space C * (X) of all continuous, bounded, real-valued functions on X with the topology of uniform convergence on compact sets. This is a variant of a result of Kunzi and Shapiro for continuous functions with compact, variable domains.

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Section: Lemma 35mentioning

confidence: 84%

“…Proof. The fact that e(g) is a continuous, bounded function on X follows from continuity and boundedness of the function g • π 1 • ϕ on m −1 (X × {dom g}) and continuity of the measures. Indeed, for a sequence {x i } from X converging to some…”

Section: Lemma 33 For Every G ∈ C *mentioning

confidence: 99%

Continuous linear extension of functions

Koyama

Stasyuk

Tymchatyn

et al. 2010

Proc. Amer. Math. Soc.

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“…Moreover, λ i ε for at least one i. For each i k and n 1 choose a neighborhood V i ⊂ K of x i and n different points x i (1) , . .…”

Section: Lemma 21 Let X Be a Complete Space K A Perfect Closed Submentioning

confidence: 99%

“…Hence, if g is a choice map associated with f , E-mail address: veskov@nipissingu.ca. 1 The author was partially supported by NSERC Grant 261914-08. Our first principal result concerns the question whenP (f ) is a soft map.…”

Section: Introductionmentioning

confidence: 99%

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Probability measures and Milyutin maps between metric spaces

Valov

2009

Journal of Mathematical Analysis and Applications

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Spaces of max-min measures on compact Hausdorff spaces

Brydun

Zarichnyi

2020

Fuzzy Sets and Systems

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The notion of max-min measure is a counterpart of the notion of maxplus measure (Maslov measure or idempotent measure). In this paper we consider the spaces of max-min measures on the compact Hausdorff spaces. It is proved that the obtained functor of max-min measures is isomorphic to the functor of max-plus (idempotent) measures considered by the second-named author. However, it turns out that the monads generated by these functors are not isomorphic.2010 Mathematics Subject Classification. 28A33, 46E27. Key words and phrases. Max-min measure, max-plus measure, compact Hausdorff space, monad. The authors are indebted to the referees for their important remarks.

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On exact atomless Milutin maps

Cited by 16 publications

References 5 publications

Continuous linear extension of functions

Continuous linear extension of functions

Probability measures and Milyutin maps between metric spaces

Spaces of max-min measures on compact Hausdorff spaces

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