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A tree T on ω is said to be cofinal if for every $α \in ω^{ω}$ there is some branch β of T such that α ≤ β, and quasi-bounded otherwise. We prove that the set of quasi-bounded trees is a complete Σ¹₁-inductive set. In particular, it is neither analytic nor co-analytic.

Quasicoincidence for intuitionistic fuzzy points.

Lupiáñez, Francisco Gallego (2005)

International Journal of Mathematics and Mathematical Sciences

Quasicone metric spaces and generalizations of Caristi Kirk's theorem.

Abdeljawad, Thabet, Karapinar, Erdal (2009)

Fixed Point Theory and Applications [electronic only]

Quasicontinuity and related properties of functions and multivalued maps

Janina Ewert (1995)

Mathematica Bohemica

The main results presented in this paper concern multivalued maps. We consider the cliquishness, quasicontinuity, almost continuity and almost quasicontinuity; these properties of multivalued maps are characterized by the analogous properties of some real functions. The connections obtained are used to prove decomposition theorems for upper and lower quasicontinuity.

Quasi-continuous fuzzy-valued maps

T. Lipski (1988)

Matematički Vesnik

Quasi-continuous multivalued mappings

Janina Ewert, Tadeusz Lipski (1983)

Mathematica Slovaca

Quasicontinuous selections for closed-valued multifunctions

Ivan Kupka (2002)

Mathematica Slovaca

Quasicontinuous selections for compact-valued multifunctions

Ivan Kupka (1993)

Mathematica Slovaca

Quasicontinuous spaces

Jing Lu, Bin Zhao, Kaiyun Wang, Dong Sheng Zhao (2022)

Commentationes Mathematicae Universitatis Carolinae

We lift the notion of quasicontinuous posets to the topology context, called quasicontinuous spaces, and further study such spaces. The main results are: (1) A $T_{0}$ space $(X, τ)$ is a quasicontinuous space if and only if $S I (X)$ is locally hypercompact if and only if $(τ_{S I}, \subseteq)$ is a hypercontinuous lattice; (2) a $T_{0}$ space $X$ is an $S I$ -continuous space if and only if $X$ is a meet continuous and quasicontinuous space; (3) if a $C$ -space $X$ is a well-filtered poset under its specialization order, then $X$ is a quasicontinuous space...

Quasicontraction nonself-mappings on convex metric spaces and common fixed point theorems.

Gajić, Ljiljana, Rakočević, Vladimir (2005)

Fixed Point Theory and Applications [electronic only]

Quasi-equivalence of compacta and spaces of components.

José M. Rodríguez Sanjurjo (1980)

Collectanea Mathematica

Let X, Y be two compacta with Sh(X) = Sh (Y). Then, the spaces of components of X, Y are homeomorphic. This does not happen, in general, when X, Y are quasi-equivalent. In this paper we give a sufficient condition for the existence of a homeomorphism between the spaces of components of two quasi-equivalent compacta X, Y which maps each component in a quasi-equivalent component.

Quasi-homeomorphisms, Goldspectral spaces and Jacspectral spaces

Othman Echi (2003)

Bollettino dell'Unione Matematica Italiana

In this paper, we deal with the study of quasi-homeomorphisms, the Goldman prime spectrum and the Jacobson prime spectrum of a commutative ring. We prove that, if $g : Y \to X$ is a quasi-homeomorphism, $Z$ a sober space and $f : Y \to Z$ a continuous map, then there exists a unique continuous map $F : X \to Z$ such that $F \circ g = f$ . Let $X$ be a $T_{0}$ -space, $q : X \to^{s} X$ the injection of $X$ onto its sobrification ${}^{s}X$ . It is shown, here, that $q (Gold (X)) = Gold ({}^{s}X)$ , where $Gold (X)$ is the set of all locally closed points of $X$ . Some applications are also indicated. The Jacobson prime spectrum...

Quasi-homogeneous associative functions.

Ebanks, Bruce R. (1998)

International Journal of Mathematics and Mathematical Sciences

Quasi-metrizable spaces with a bicomplete structure.

Salvador Romaguera, Sergio Salbany (1992)

Extracta Mathematicae

Quasi-metrization and completion for Pervin's quasi-uniformity.

V. Gregori, J. Ferrer (1982)

Stochastica

R. Stoltenberg characterized in [2] those quasi-uniformities which are quasi-pseudometrizable, as well as those quasi-metric spaces which have a quasi-metric completion. In this paper we follow Stoltenberg's work by giving characterizations for quasi-metrizability and quasi-metric completion for a particular type of quasi-uniform spaces, the Pervin's quasi-uniform space.

Quasi-metrization and hereditary normality of compact bitopological spaces

Salvador Romaguera, Sergio Salbany (1990)

Commentationes Mathematicae Universitatis Carolinae

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