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An isomorphical classification of function spaces of zero-dimensional locally compact separable metric spaces

Jan Baars, Joost de Groot (1988)

Commentationes Mathematicae Universitatis Carolinae

An iteration for finding a common random fixed point.

Choudhury, Binayak S. (2004)

Journal of Applied Mathematics and Stochastic Analysis

An iteration process for nonlinear mappings in uniformly convex linear metric spaces

Ismat Beg (2003)

Czechoslovak Mathematical Journal

We obtain necessary conditions for convergence of the Cauchy Picard sequence of iterations for Tricomi mappings defined on a uniformly convex linear complete metric space.

An n-dimensional compactum which remains n-dimensional after removing all Cantor n-manifolds

Roman Pol (1990)

Fundamenta Mathematicae

An n-dimensional version of Wage's example

K. Tsuda (1984)

Colloquium Mathematicae

An observation for simple expansions.

Rose, David A., Janković, Dragan A. (1992)

International Journal of Mathematics and Mathematical Sciences

An observation on Kannan mappings

Masato Nakanishi, Tomonari Suzuki (2010)

Open Mathematics

In order to observe the condition of Kannan mappings more deeply, we prove a generalization of Kannan’s fixed point theorem.

An observation on Krull and derived dimensions of some topological lattices

M. Rostami, Ilda I. Rodrigues (2011)

Archivum Mathematicum

Let $(L, \leq)$ , be an algebraic lattice. It is well-known that $(L, \leq)$ with its topological structure is topologically scattered if and only if $(L, \leq)$ is ordered scattered with respect to its algebraic structure. In this note we prove that, if $L$ is a distributive algebraic lattice in which every element is the infimum of finitely many primes, then $L$ has Krull-dimension if and only if $L$ has derived dimension. We also prove the same result for $error L$ , the set of all prime elements of $L$ . Hence the dimensions on the lattice...

An observation on spaces with a zeroset diagonal

Wei-Feng Xuan (2020)

Mathematica Bohemica

We say that a space $X$ has the discrete countable chain condition (DCCC for short) if every discrete family of nonempty open subsets of $X$ is countable. A space $X$ has a zeroset diagonal if there is a continuous mapping $f : X^{2} \to [0, 1]$ with $Δ_{X} = f^{- 1} (0)$ , where $Δ_{X} = {(x, x) : x \in X}$ . In this paper, we prove that every first countable DCCC space with a zeroset diagonal has cardinality at most $𝔠$ .

An open-perfect mapping on a hereditarily disconnected space onto a connected space

R. Pol, E. Puzio (1975)

Fundamenta Mathematicae

An operator equation in a Tychonoff space.

P.V. Subrahmanyan (1980)

Aequationes mathematicae

An order on subsets of cone metric spaces and fixed points of set-valued contractions.

Asadi, M., Soleimani, H., Vaezpour, S.M. (2009)

Fixed Point Theory and Applications [electronic only]

An R-stable ANR which is not FR-stable

Sukhjit Singh (1979)

Fundamenta Mathematicae

An Ulam stability result on quasi-b-metric-like spaces

Hamed H. Alsulami, Selma Gülyaz, Erdal Karapınar, İnci M. Erhan (2016)

Open Mathematics

In this paper a class of general type α-admissible contraction mappings on quasi-b-metric-like spaces are defined. Existence and uniqueness of fixed points for this class of mappings is discussed and the results are applied to Ulam stability problems. Various consequences of the main results are obtained and illustrative examples are presented.

An uncountable collection of mutually exclusive planar atriodic tree-like continua with positive span

W. Ingram (1974)

Fundamenta Mathematicae

An up-spectral space need not be $A$ -spectral.

Echi, Othman, Gargouri, Riyadh (2004)

The New York Journal of Mathematics [electronic only]

Analyse de récession et résultats de stabilité d’une convergence variationnelle, application à la théorie de la dualité en programmation mathématique

Driss Mentagui (2003)

ESAIM: Control, Optimisation and Calculus of Variations

Soit $X$ un espace de Banach de dual topologique $X^{'}$ . $𝒞 (X)$ (resp. $𝒞 (X^{'})$ ) désigne l’ensemble des parties non vides convexes fermées de $X$ (resp. $w^{*}$ -fermées de $X^{'}$ ) muni de la topologie de la convergence uniforme sur les bornés des fonctions distances. Cette topologie se réduit à celle de la métrique de Hausdorff sur les convexes fermés bornés [16] et admet en général une représentation en terme de cette dernière [11]. De plus, la métrique qui lui est associée s’est révélée très adéquate pour l’étude quantitative...

Analyse de récession et résultats de stabilité d'une convergence variationnelle, application à la théorie de la dualité en programmation mathématique

Driss Mentagui (2010)

ESAIM: Control, Optimisation and Calculus of Variations

Let X be a Banach space and X' its continuous dual. C(X) (resp. C(X')) denotes the set of nonempty convex closed subsets of X (resp. ω*-closed subsets of X') endowed with the topology of uniform convergence of distance functions on bounded sets. This topology reduces to the Hausdorff metric topology on the closed and bounded convex sets [16] and in general has a Hausdorff-like presentation [11]. Moreover, this topology is well suited for estimations and constructive approximations [6-9]. We...

Analyse relative

Yves Peraire (1992)

Annales scientifiques de l'Université de Clermont. Mathématiques

Analysis on topological manifolds

P. Duvall, L. Husch (1972)

Fundamenta Mathematicae

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