AbstractThe notion of being a Whitney preserving map is introduced. Conditions are given on a space X in order that a Whitney preserving function f from X to the unit interval is a homeomorphism
AbstractIt is proved that the property of being a uniformly pathwise connected continuum is a Whitne...
All spaces considered in this paper are assumed to be metric. A continuum meas a compact connected s...
Let X be a non-metric continuum, and C(X) be the hyperspace of subcontinua of X. It is known that th...
We connect Whitney levels and continuous functions between continua to obtain the new notion of Whit...
We connect Whitney levels and continuous functions between continua to obtain the new notion of Whit...
We connect Whitney levels and continuous functions between continua to obtain the new notion of Whit...
AbstractFor a Whitney preserving map f:X→G we show the following: (a) If X is arcwise connected and ...
AbstractLet X be a continuum and let C(X) be the space of subcontinua of X. In this paper we conside...
In [2] Espinoza proved that every Whitney preserving map f: X → I from a continuum X containing a de...
AbstractThe notion of being a Whitney preserving map is introduced. Conditions are given on a space ...
AbstractFor a Whitney preserving map f:X→G we show the following: (a) If X is arcwise connected and ...
Throughout this paper X is a metric continuum and C(X) is the space of all subcontinua of X with the...
In [15] Whitney proved that for any continuum X there exists a map ~ from C(X), the hyperspace of su...
In [15] Whitney proved that for any continuum X there exists a map ~ from C(X), the hyperspace of su...
If (X, d) is a metric continuum, C(X) stands for the hyperspace of all nonempty subcontinua of X, en...
AbstractIt is proved that the property of being a uniformly pathwise connected continuum is a Whitne...
All spaces considered in this paper are assumed to be metric. A continuum meas a compact connected s...
Let X be a non-metric continuum, and C(X) be the hyperspace of subcontinua of X. It is known that th...
We connect Whitney levels and continuous functions between continua to obtain the new notion of Whit...
We connect Whitney levels and continuous functions between continua to obtain the new notion of Whit...
We connect Whitney levels and continuous functions between continua to obtain the new notion of Whit...
AbstractFor a Whitney preserving map f:X→G we show the following: (a) If X is arcwise connected and ...
AbstractLet X be a continuum and let C(X) be the space of subcontinua of X. In this paper we conside...
In [2] Espinoza proved that every Whitney preserving map f: X → I from a continuum X containing a de...
AbstractThe notion of being a Whitney preserving map is introduced. Conditions are given on a space ...
AbstractFor a Whitney preserving map f:X→G we show the following: (a) If X is arcwise connected and ...
Throughout this paper X is a metric continuum and C(X) is the space of all subcontinua of X with the...
In [15] Whitney proved that for any continuum X there exists a map ~ from C(X), the hyperspace of su...
In [15] Whitney proved that for any continuum X there exists a map ~ from C(X), the hyperspace of su...
If (X, d) is a metric continuum, C(X) stands for the hyperspace of all nonempty subcontinua of X, en...
AbstractIt is proved that the property of being a uniformly pathwise connected continuum is a Whitne...
All spaces considered in this paper are assumed to be metric. A continuum meas a compact connected s...
Let X be a non-metric continuum, and C(X) be the hyperspace of subcontinua of X. It is known that th...
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