AbstractA dendroid X is said to be weakly arcwise open if for each point p of X each arc component of X∖{p} either is open or has empty interior. We study various mapping properties of these dendroids. The leading problem is what classes of mappings between dendroids preserve the property of being weakly arcwise open
AbstractLet X be a metric continuum. Let A(X)={A⊂X:A is an arc or a one-point set} and F2(X)={A⊂X:A ...
The origin of this researchl was the following problem raised by A. R. Stralka in 1972: Is it true t...
We investigate relationships between confluent, serniconfluent, weakly confluent, weakly arc-preser...
A dendroid X is said to be weakly arcwise open (WAO) at p ∈ X if each arc component of X {p} is eit...
Abstract. A dendroidX is saidto beweaklyarcwiseopen(WAG) atp E X if eacharccomponent of X \ {p}is ei...
Abstract. A smooth dendroid is an arcwise connected, hereditarily unico-herent, metric continuum hav...
summary:Whyburn has proved that each open mapping defined on arc (a simple closed curve) is light. C...
AbstractGiven a dendroid X, an open selection is an open map s:C(X)→X such that s(A)∈A for every A∈C...
AbstractWe introduce a class of smooth dendroids (called weak hairy arcs) which generalizes the hair...
AbstractA continuum M is almost arcwise connected if each pair of nonempty open subsets of M can be ...
We define and investigate a class of continua called weakly smooth. Smooth dendroids, weakly smooth ...
We define and investigate a class of continua called weakly smooth. Smooth dendroids, weakly smooth ...
AbstractHomogeneous arcwise connected metric continua are shown to, in effect, be arcwise connected ...
The origin of this researchl was the following problem raised by A. R. Stralka in 1972: Is it true t...
Structural characterizations are obtained of images of the Cantor fan (i.e., the cone over the Canto...
AbstractLet X be a metric continuum. Let A(X)={A⊂X:A is an arc or a one-point set} and F2(X)={A⊂X:A ...
The origin of this researchl was the following problem raised by A. R. Stralka in 1972: Is it true t...
We investigate relationships between confluent, serniconfluent, weakly confluent, weakly arc-preser...
A dendroid X is said to be weakly arcwise open (WAO) at p ∈ X if each arc component of X {p} is eit...
Abstract. A dendroidX is saidto beweaklyarcwiseopen(WAG) atp E X if eacharccomponent of X \ {p}is ei...
Abstract. A smooth dendroid is an arcwise connected, hereditarily unico-herent, metric continuum hav...
summary:Whyburn has proved that each open mapping defined on arc (a simple closed curve) is light. C...
AbstractGiven a dendroid X, an open selection is an open map s:C(X)→X such that s(A)∈A for every A∈C...
AbstractWe introduce a class of smooth dendroids (called weak hairy arcs) which generalizes the hair...
AbstractA continuum M is almost arcwise connected if each pair of nonempty open subsets of M can be ...
We define and investigate a class of continua called weakly smooth. Smooth dendroids, weakly smooth ...
We define and investigate a class of continua called weakly smooth. Smooth dendroids, weakly smooth ...
AbstractHomogeneous arcwise connected metric continua are shown to, in effect, be arcwise connected ...
The origin of this researchl was the following problem raised by A. R. Stralka in 1972: Is it true t...
Structural characterizations are obtained of images of the Cantor fan (i.e., the cone over the Canto...
AbstractLet X be a metric continuum. Let A(X)={A⊂X:A is an arc or a one-point set} and F2(X)={A⊂X:A ...
The origin of this researchl was the following problem raised by A. R. Stralka in 1972: Is it true t...
We investigate relationships between confluent, serniconfluent, weakly confluent, weakly arc-preser...
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