Separation axioms and covering dimension of asymmetric normed spaces

Donjuán, Victor; Jonard-Pérez, Natalia

doi:10.2989/16073606.2019.1581298

Cited by 31 publications

(6 citation statements)

References 17 publications

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“…In particular, as ψ one can consider any asymmetric norm ∥ • | (assuming that it is continuous). Note that continuity of ∥ • | is equivalent to saying that the ball B(0, 1) is closed (see [18]).…”

Section: Definitionmentioning

confidence: 99%

$\theta$-metric function in the problem of minimization of functionals

Tsar'kov

2024

Izv. Math.

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We study approximative properties of sets as a function of the rate of variation of the distance function defined in terms of some continuous functional (in lieu of a metric). As an application, we prove non-uniqueness of approximation by non-convex subsets of Hilbert spaces with respect to special continuous functionals. Results of this kind are capable of proving non-uniqueness solvability for gradient-type equations.

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Section: Definitionmentioning

confidence: 99%

$\theta$-metric function in the problem of minimization of functionals

Tsar'kov

2024

Izv. Math.

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“…The theory of asymmetric normed spaces and their applications is in active development at the present time. For example, various topological and functionalanalytic topics are considered in [17], [18], and [24], optimal location problems (with asymmetric norms) are studied, for instance, in [25], [47], and [43] (in such problems, an important role is also played by Chebyshev centres and Chebyshev nets relative to the asymmetric norms), and problems related to principal component analysis in statistics (one of the most popular methods of compact representation of data) are dealt with in [56]. For other applications, also see [17].…”

Section: Spaces With Asymmetric Distance and Their Generalizationsmentioning

confidence: 99%

Existence, uniqueness, and stability of best and near-best approximations

Alimov,

Ryutin,

Tsar'kov

2023

Russian Math. Surveys

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Existence and stability of $\varepsilon$-selections (selections of operators of near-best approximation) are studied. Results relating the existence of continuous $\varepsilon$-selections with other approximative and structural properties of approximating sets are given. Both abstract and concrete sets are considered - the latter include $n$-link piecewise linear functions, $n$-link $r$-polynomial functions and their generalizations, $k$-monotone functions, and generalized rational functions. Classical problems of the existence, uniqueness, and stability of best and near-best generalized rational approximations are considered. Bibliography: 70 titles.

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“…An important example of such a space is the space of all closed bounded sets equipped with the Hausdorff metric. For numerous results on general properties of asymmetric spaces, and various problems of geometric approximation theory, see, for example, [1]- [16].…”

Section: § 1 Introductionmentioning

confidence: 99%

Continuous selections of set-valued mappings and approximation in asymmetric and semilinear spaces

Tsar'kov

2023

Izv. Math.

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The Michael selection theorem is extended to the case of set-valued mappings with not necessarily convex values. Classical approximation problems on cone-spaces with symmetric and asymmetric seminorms are considered. In particular, conditions for existence of continuous selections for convex subsets of asymmetric spaces are studied. The problem of existence of a Chebyshev centre for a bounded set is solved in a semilinear space consisting of bounded convex sets with Hausdorff semimetric.

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Separation axioms and covering dimension of asymmetric normed spaces

Cited by 31 publications

References 17 publications

$\theta$-metric function in the problem of minimization of functionals

$\theta$-metric function in the problem of minimization of functionals

Existence, uniqueness, and stability of best and near-best approximations

Continuous selections of set-valued mappings and approximation in asymmetric and semilinear spaces

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