AbstractWe investigate the structure of the collection of terminal subcontinua in homogeneous continua. The main result is a reduction of this structure to six specific types. Three of these types are of one-dimensional spaces, and examples representing these types are known. It is not known whether higher dimensional examples having non-trivial terminal subcontinua and representing the three remaining types exist
The study of homogeneity in one-dimensional continua has been an area of significant interest and ac...
AbstractIn 1979 Sam B. Nadler Jr, defined the Hyperspace Suspension of a continuum. We study a natur...
We deal with an analogue of the cone = hyperspace property for generalized continua. Namely, we stud...
AbstractWe investigate the structure of the collection of terminal subcontinua in homogeneous contin...
AbstractNew tools are introduced for the study of homogeneous continua. The subcontinua of a given c...
The paper is devoted to continuously homogeneous continua. We consider products, hyperspaces and arc...
We continue our study of n-fold hyperspaces and n-fold hyperspace suspensions.We present more proper...
The concept of a terminal continuum introduced in 1973 by G. R. Gordh Jr., for hereditarily unicoher...
The concept of a terminal continuum introduced in 1973 by G. R. Gordh Jr., for hereditarily unicoher...
We continue our study of n-fold hyperspaces and n-fold hyperspace suspensions. We present more prope...
summary:Interrelations between three concepts of terminal continua and their behaviour, when the und...
This book is a significant companion text to the existing literature on continuum theory. It opens w...
AbstractThe notion of a terminal continuum, as defined by D.E. Bennett and J.B. Fugate, is used to i...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
The study of homogeneity in one-dimensional continua has been an area of significant interest and ac...
AbstractIn 1979 Sam B. Nadler Jr, defined the Hyperspace Suspension of a continuum. We study a natur...
We deal with an analogue of the cone = hyperspace property for generalized continua. Namely, we stud...
AbstractWe investigate the structure of the collection of terminal subcontinua in homogeneous contin...
AbstractNew tools are introduced for the study of homogeneous continua. The subcontinua of a given c...
The paper is devoted to continuously homogeneous continua. We consider products, hyperspaces and arc...
We continue our study of n-fold hyperspaces and n-fold hyperspace suspensions.We present more proper...
The concept of a terminal continuum introduced in 1973 by G. R. Gordh Jr., for hereditarily unicoher...
The concept of a terminal continuum introduced in 1973 by G. R. Gordh Jr., for hereditarily unicoher...
We continue our study of n-fold hyperspaces and n-fold hyperspace suspensions. We present more prope...
summary:Interrelations between three concepts of terminal continua and their behaviour, when the und...
This book is a significant companion text to the existing literature on continuum theory. It opens w...
AbstractThe notion of a terminal continuum, as defined by D.E. Bennett and J.B. Fugate, is used to i...
AbstractWe investigate continua with the property that the cone over the continuum is homeomorphic t...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
The study of homogeneity in one-dimensional continua has been an area of significant interest and ac...
AbstractIn 1979 Sam B. Nadler Jr, defined the Hyperspace Suspension of a continuum. We study a natur...
We deal with an analogue of the cone = hyperspace property for generalized continua. Namely, we stud...
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