Add to ORKGThe purpose of this paper is to prove: Théorème: In order that a continuum M should be a continuous curve it is necessary and sufficient that for every two distinct points A and B of M there should exist a subset of M which consists of a finite number of continua and which separates A from B in M. Théorème: In order that a bounded continuum M should be a continuous curve which contains no domain and does not separate the plane it is necessary and sufficient that for every two distinct points A and B which belong to M there should exist a point which separates A from B in M
The question (raised in [7]) whether every homogeneous family of separators of a locally connected m...
Abstract. If f: X � Y is a refinable map and X is a continuum that is (1) an acyclic curve, (2) a θn...
ABSTRACT. A space is homogeneous if for each pair p, q of its points there exists a homeomorphism of...
The present paper has three main objects, viz., (1) To study the analogy between ordinary two-dimens...
The present paper has three main objects: 1. to study the analogy between ordinary two-dimensional s...
The present paper has three main objects, viz., (1) To study the analogy between ordinary two-dimens...
Part I of this paper has to do with connected sets of cut points of a given continuous curve. It wi...
In this paper a study will be made of Plane continua. Part I deals with continua which constitute th...
In this paper a study will be made of Plane continua. Part I deals with continua which constitute th...
Karl Menger has shown that a necessary and sufficient condition that a plane continuum M contains no...
We say that a continuous transformation f of a compact metric space X onto a metric space Y is confl...
Certain theorems that apply to compact, metric continua that are separated by none of their subconti...
The question (raised in [7]) whether every homogeneous family of separators of a locally connected m...
The question (raised in [7]) whether every homogeneous family of separators of a locally connected m...
The question (raised in [7]) whether every homogeneous family of separators of a locally connected m...
The question (raised in [7]) whether every homogeneous family of separators of a locally connected m...
Abstract. If f: X � Y is a refinable map and X is a continuum that is (1) an acyclic curve, (2) a θn...
ABSTRACT. A space is homogeneous if for each pair p, q of its points there exists a homeomorphism of...
The present paper has three main objects, viz., (1) To study the analogy between ordinary two-dimens...
The present paper has three main objects: 1. to study the analogy between ordinary two-dimensional s...
The present paper has three main objects, viz., (1) To study the analogy between ordinary two-dimens...
Part I of this paper has to do with connected sets of cut points of a given continuous curve. It wi...
In this paper a study will be made of Plane continua. Part I deals with continua which constitute th...
In this paper a study will be made of Plane continua. Part I deals with continua which constitute th...
Karl Menger has shown that a necessary and sufficient condition that a plane continuum M contains no...
We say that a continuous transformation f of a compact metric space X onto a metric space Y is confl...
Certain theorems that apply to compact, metric continua that are separated by none of their subconti...
The question (raised in [7]) whether every homogeneous family of separators of a locally connected m...
The question (raised in [7]) whether every homogeneous family of separators of a locally connected m...
The question (raised in [7]) whether every homogeneous family of separators of a locally connected m...
The question (raised in [7]) whether every homogeneous family of separators of a locally connected m...
Abstract. If f: X � Y is a refinable map and X is a continuum that is (1) an acyclic curve, (2) a θn...
ABSTRACT. A space is homogeneous if for each pair p, q of its points there exists a homeomorphism of...