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Induced open projections and C*-smoothness

Włodzimierz J. Charatonik; Alejandro Illanes; Verónica Martínez-de-la-Vega — 2013

Colloquium Mathematicae

We show that there exists a C*-smooth continuum X such that for every continuum Y the induced map C(f) is not open, where f: X × Y → X is the projection. This answers a question of Charatonik (2000).

A hit-and-miss topology for $2^{X}$ , Cₙ(X) and Fₙ(X)

Benjamín Espinoza; Verónica Martínez-de-la-Vega; Jorge M. Martínez-Montejano — 2009

Colloquium Mathematicae

A hit-and-miss topology ( $τ_{H M}$ ) is defined for the hyperspaces $2^{X}$ , Cₙ(X) and Fₙ(X) of a continuum X. We study the relationship between $τ_{H M}$ and the Vietoris topology and we find conditions on X for which these topologies are equivalent.

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Induced open projections and C*-smoothness

A hit-and-miss topology for 2 X , Cₙ(X) and Fₙ(X)

A hit-and-miss topology for $2^{X}$ , Cₙ(X) and Fₙ(X)