AbstractWe show that Lelekʼs problem on the chainability of continua with span zero is not a metric problem: from a non-metric counterexample one can construct a metric one
A metric space (X, d) is called finitely chainable if for every epsilon > 0, there are finitely many...
We show that the endpoint set of a Suslinian chainable continuum must be zero-dimensional at some po...
AbstractSuppose that {Yi}i=1∞ is a collection of disjoint subcontinua of continuum X such that limi→...
AbstractWe show that Lelekʼs problem on the chainability of continua with span zero is not a metric ...
Lelek's conjecture which states that metric continua with span zero are chainable has been one of th...
The set of compact connected metric spaces (continua) can be divided into classes according to the c...
AbstractWe show that the continua Iu and H∗ are nonchainable and have span nonzero. Under CH this ca...
Abstract. It is an open problem whether all continua with zero span are chainable. It is known that ...
On the surface, the definitions of chainability and Lebesgue covering dimension ⩽1 are quite similar...
AbstractOn the surface, the definitions of chainability and Lebesgue covering dimension ⩽1 are quite...
A continuum is called continuum-chainable provided for any pair of points and positive epsilon there...
Abstract. A plane continuum is constructed which has span zero but is not chainable. 1
AbstractWe construct an example of a non-metric perfectly normal hereditarily indecomposable continu...
Abstract. We show there is no categorical metric continuum. This means that for every metric continu...
AbstractTopics about continua (compact connected metric spaces) are related to Geometry, Topology an...
A metric space (X, d) is called finitely chainable if for every epsilon > 0, there are finitely many...
We show that the endpoint set of a Suslinian chainable continuum must be zero-dimensional at some po...
AbstractSuppose that {Yi}i=1∞ is a collection of disjoint subcontinua of continuum X such that limi→...
AbstractWe show that Lelekʼs problem on the chainability of continua with span zero is not a metric ...
Lelek's conjecture which states that metric continua with span zero are chainable has been one of th...
The set of compact connected metric spaces (continua) can be divided into classes according to the c...
AbstractWe show that the continua Iu and H∗ are nonchainable and have span nonzero. Under CH this ca...
Abstract. It is an open problem whether all continua with zero span are chainable. It is known that ...
On the surface, the definitions of chainability and Lebesgue covering dimension ⩽1 are quite similar...
AbstractOn the surface, the definitions of chainability and Lebesgue covering dimension ⩽1 are quite...
A continuum is called continuum-chainable provided for any pair of points and positive epsilon there...
Abstract. A plane continuum is constructed which has span zero but is not chainable. 1
AbstractWe construct an example of a non-metric perfectly normal hereditarily indecomposable continu...
Abstract. We show there is no categorical metric continuum. This means that for every metric continu...
AbstractTopics about continua (compact connected metric spaces) are related to Geometry, Topology an...
A metric space (X, d) is called finitely chainable if for every epsilon > 0, there are finitely many...
We show that the endpoint set of a Suslinian chainable continuum must be zero-dimensional at some po...
AbstractSuppose that {Yi}i=1∞ is a collection of disjoint subcontinua of continuum X such that limi→...
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