Results 81 to 90 of about 239 (123)
Confluent Mappings and Arc Kelley Continua
A Kelley continuum X, also called a continuum with the property of Kelley, such that, for each p X, each subcontinuum K containing p is approximated by arc-wise connected continua containing p, is called an arc Kelley continuum.
J.J. Charatonik +5 more
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Some Remarks on Continuously Homogeneous Continua
The paper is devoted to continuously homogeneous continua.
Garncarek, Zbigniew, Charatonik, W. J.
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Embedding Smooth Dendroids in Hyperspaces
A continuum will be a connected, compact, metric space. By a mapping we mean a continuous function. By a partially ordered space X we mean a continuum X together with a partial order which is closed when regarded as a subset of X × X. We let 2x (resp.
E. D. Tymchatyn, J. Grispolakis
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Two Continua Having A Property of J. L. Kelley
In proving the contractibility of certain hyperspaces J. L. Kelley identified and defined a certain uniformnessproperty which he called Property 3.2.
D. D. Sherling, W. T. Ingram
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Induced Mappings between Hyperspaces of Convergent Sequences
Los hiperespacio de un continuo es una colección de subconjuntos cerrados del continuo bajo algunas condiciones, los hiperespacios que se estudiarán es el hiperespacio de sucesiones convergentes triviales $\mathcal{S}_c(X)$, donde este contiene todas las
Andrade Durán, Álvaro Javier
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Specialized as it might be, continuum theory is one of the most intriguing areas in mathematics. However, despite being popular journal fare, few books have thoroughly explored this interesting aspect of topology.
Macias, Sergio
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Non-metric Rim-metrizable continua and unique hyperspace
A class A of continua is said to be C-determined provided that if X, Y e A and C(X) homeomorphic C(Y), then X mhomeomorphic Y. A continuum X has unique hyperspace provided that if Y is a continuum and C(X) homeomorphic to C(Y), then X homeomorphic to Y.
openaire +4 more sources
Shape properties of Whitney maps for hyperspaces
In this paper, some shape properties of Whitney maps for hyperspaces are investigated. In particular, the following are proved: (1) Let X X be a continuum and let H \mathfrak {H} be the hyperspace
Hisao Kato
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Induced mappings confluent between hyperspaces of continuum’.
El estudio de las funciones continuas, en ciertas áreas de las matemáticas, es de gran importancia, pues son una herramienta que nos permite comparar las propiedades entre espacios.
Prada Marín, Duwamg Alexis
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Hyperspaces of Peano continua of euclidean spaces
. If X is a space then L(X) denotes the subspace of C(X) consisting of all Peano (sub)continua. We prove that for n ≥ 3 the space L(R n ) is homeomorphic to B ∞ , where B denotes the pseudo-boundary of the Hilbert cube Q. Introduction. For a space X, C(X)
Jan V A N M I L L (amsterdam, Helma G
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