Add to ORKGThis thesis is about dendroids and their properties. Another example of a dendroid with two intersecting shore continua whose union is not a shore continuum is constructed. Moreover, a simplification of a proof that the union of finitely many pairwise disjoint shore continua is again a shore continuum has been made. But the main result is an affirmative answer to the question whether the union of finitely many closed shore sets is again a closed shore set in the case dendroids with only finitely many branch points. Powered by TCPDF (www.tcpdf.org
Abstract. We prove that every chainable continuum can be mapped into a dendroid such that all point-...
AbstractIf X is a continuum and μ a Whitney map for C(X), a subcontinuum Y of C(X) is μ-conical poin...
AbstractA subcontinuum C of a dendroid X is a bottleneck if it intersects every arc connecting two n...
AbstractA subset of a given continuum is called a shore set if there is a sequence of continua in th...
A dendroid is the disjoint union of the set of centers and the set of shore points. We show this is ...
A point x in a dendroid X is called a shore point if there is a sequence of subdendroids of X not co...
AbstractA bottleneck in a dendroid is a continuum that intersects every arc connecting two nonempty ...
When the definition of dendroids was started to be formulated, 1958/1959 and in the early sixties of...
In this thesis, we present solutions to several problems concerning one-dimensi- onal continua. We g...
Abstract. We answer a question of B. Knaster by constructing an uncount-able collection of dendroids...
If X is a continuum and mu a Whitney map for C(X), a subcontinuum Y of C(X) is mu-conical pointed if...
A continuum means comp6lct, connected metric space. A hereditarily unicoherent and arcwise connected...
We study several natural classes and relations occurring in continuum theory from the viewpoint of d...
AbstractWe prove that every chainable continuum can be mapped into a dendroid such that all point-in...
An uncountable collection of uniformly arcwise connected plane Suslinian dendroids is constructed wh...
Abstract. We prove that every chainable continuum can be mapped into a dendroid such that all point-...
AbstractIf X is a continuum and μ a Whitney map for C(X), a subcontinuum Y of C(X) is μ-conical poin...
AbstractA subcontinuum C of a dendroid X is a bottleneck if it intersects every arc connecting two n...
AbstractA subset of a given continuum is called a shore set if there is a sequence of continua in th...
A dendroid is the disjoint union of the set of centers and the set of shore points. We show this is ...
A point x in a dendroid X is called a shore point if there is a sequence of subdendroids of X not co...
AbstractA bottleneck in a dendroid is a continuum that intersects every arc connecting two nonempty ...
When the definition of dendroids was started to be formulated, 1958/1959 and in the early sixties of...
In this thesis, we present solutions to several problems concerning one-dimensi- onal continua. We g...
Abstract. We answer a question of B. Knaster by constructing an uncount-able collection of dendroids...
If X is a continuum and mu a Whitney map for C(X), a subcontinuum Y of C(X) is mu-conical pointed if...
A continuum means comp6lct, connected metric space. A hereditarily unicoherent and arcwise connected...
We study several natural classes and relations occurring in continuum theory from the viewpoint of d...
AbstractWe prove that every chainable continuum can be mapped into a dendroid such that all point-in...
An uncountable collection of uniformly arcwise connected plane Suslinian dendroids is constructed wh...
Abstract. We prove that every chainable continuum can be mapped into a dendroid such that all point-...
AbstractIf X is a continuum and μ a Whitney map for C(X), a subcontinuum Y of C(X) is μ-conical poin...
AbstractA subcontinuum C of a dendroid X is a bottleneck if it intersects every arc connecting two n...