Add to ORKGWe investigate what Kelley continua can be approximated by a ray in such a way that the union is a Kelley continua. We show that continua containing triods may not be approximated in this manner, while for hereditarily indecomposable continua, every approximation works. Our main result is that that such an approximation exists for any arc-like continua
We generalize the property of Kelley for continua to the non-metric case. Basic properties that are ...
Abstract. A continuum X having the property of Kelley is constructed such that neither X[0; 1], nor ...
Abstract. It is shown that (1) the family of all continua in In, n ≥ 2, which have the property of K...
We investigate absolute retracts for hereditarily unicoherent continua, and also the continua that h...
Abstract. We investigate Kelley continua that arise as the remainder of Kelley compactifications of ...
The property of Kelley for confluent retractable continua is studied. It is shown that a confluent r...
AbstractThe property of Kelley for confluent retractable continua is studied. It is shown that a con...
The property of Kelley for confluent retractable continua is studied. It is shown that a confluent r...
We investigate Kelley continua that arise as theremainder of Kelley compactications of [0, 1). We ca...
We will show conditions under which the inverse limit of Kelley continua is a Kelley continuum. Than...
A weaker form of the property of Kelley formetric continua is deØned and studied. Its mapping prop-e...
AbstractIn this paper, we characterize one-dimensional continua in terms of graph-chains and then us...
The main purpose of this paper is to construct a 2-equivalent compactification X of a ray whose rema...
The main purpose of this paper is to construct a 2-equivalent compactification X of a ray whose rema...
It is known that no dendrite (Gottschalk 1947) and no hereditarily indecomposable tree-like continuu...
We generalize the property of Kelley for continua to the non-metric case. Basic properties that are ...
Abstract. A continuum X having the property of Kelley is constructed such that neither X[0; 1], nor ...
Abstract. It is shown that (1) the family of all continua in In, n ≥ 2, which have the property of K...
We investigate absolute retracts for hereditarily unicoherent continua, and also the continua that h...
Abstract. We investigate Kelley continua that arise as the remainder of Kelley compactifications of ...
The property of Kelley for confluent retractable continua is studied. It is shown that a confluent r...
AbstractThe property of Kelley for confluent retractable continua is studied. It is shown that a con...
The property of Kelley for confluent retractable continua is studied. It is shown that a confluent r...
We investigate Kelley continua that arise as theremainder of Kelley compactications of [0, 1). We ca...
We will show conditions under which the inverse limit of Kelley continua is a Kelley continuum. Than...
A weaker form of the property of Kelley formetric continua is deØned and studied. Its mapping prop-e...
AbstractIn this paper, we characterize one-dimensional continua in terms of graph-chains and then us...
The main purpose of this paper is to construct a 2-equivalent compactification X of a ray whose rema...
The main purpose of this paper is to construct a 2-equivalent compactification X of a ray whose rema...
It is known that no dendrite (Gottschalk 1947) and no hereditarily indecomposable tree-like continuu...
We generalize the property of Kelley for continua to the non-metric case. Basic properties that are ...
Abstract. A continuum X having the property of Kelley is constructed such that neither X[0; 1], nor ...
Abstract. It is shown that (1) the family of all continua in In, n ≥ 2, which have the property of K...