Add to ORKGAbstract. We investigate Kelley continua that arise as the remainder of Kelley compactifications of [0,∞). We call such continua Kelley remainders. The main results of the paper are that all arc-like Kelley continua and all Kelley arc continua are Kelley remainders. We also show that being such a remainder is preserved under confluent mappings
We will show conditions under which the inverse limit of Kelley continua is a Kelley continuum. Than...
Abstract. A continuum X having the property of Kelley is constructed such that neither X × [0, 1], n...
The main purpose of this paper is to construct a 2-equivalent compactification X of a ray whose rema...
We investigate Kelley continua that arise as theremainder of Kelley compactications of [0, 1). We ca...
We investigate absolute retracts for hereditarily unicoherent continua, and also the continua that h...
We investigate what Kelley continua can be approximated by a ray in such a way that the union is a K...
The property of Kelley for confluent retractable continua is studied. It is shown that a confluent r...
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...
AbstractWe give a sufficient condition for a general class of continua to be remainders of a space X...
A weaker form of the property of Kelley formetric continua is deØned and studied. Its mapping prop-e...
Mapping conditions are studied under which a continuum having the property of Kelley has this prope...
The main purpose of this paper is to construct a 2-equivalent compactification X of a ray whose rema...
Abstract. A. Lelek asked which continua are remainders of locally connected compactifications of the...
Abstract. A continuum X having the property of Kelley is constructed such that neither X[0; 1], nor ...
We will show conditions under which the inverse limit of Kelley continua is a Kelley continuum. Than...
Abstract. A continuum X having the property of Kelley is constructed such that neither X × [0, 1], n...
The main purpose of this paper is to construct a 2-equivalent compactification X of a ray whose rema...
We investigate Kelley continua that arise as theremainder of Kelley compactications of [0, 1). We ca...
We investigate absolute retracts for hereditarily unicoherent continua, and also the continua that h...
We investigate what Kelley continua can be approximated by a ray in such a way that the union is a K...
The property of Kelley for confluent retractable continua is studied. It is shown that a confluent r...
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...
AbstractWe give a sufficient condition for a general class of continua to be remainders of a space X...
A weaker form of the property of Kelley formetric continua is deØned and studied. Its mapping prop-e...
Mapping conditions are studied under which a continuum having the property of Kelley has this prope...
The main purpose of this paper is to construct a 2-equivalent compactification X of a ray whose rema...
Abstract. A. Lelek asked which continua are remainders of locally connected compactifications of the...
Abstract. A continuum X having the property of Kelley is constructed such that neither X[0; 1], nor ...
We will show conditions under which the inverse limit of Kelley continua is a Kelley continuum. Than...
Abstract. A continuum X having the property of Kelley is constructed such that neither X × [0, 1], n...
The main purpose of this paper is to construct a 2-equivalent compactification X of a ray whose rema...