ABSTRACT. Several closely related types of set convergence are defined and discussed. These concepts are used to unify old and new results with inverse limits. In addition, relationships with homotopy regular convergence are established. Necessary and sufficient conditions stating when a sequence of compact connected n-dimensional ANR's, which converge uniformly inversely, converge to an ANR in a metric space are given. 1. Introduction. Th
In [I.Banič, M. Črepnjak, M. Merhar, U. Milutinović, Limits of inverse limits, Topology Appl. 157 (2...
[[abstract]]In this paper, first we will introduce a topology into p(), power set of a set , given...
We consider an inverse-free Jarratt-type approximation of order four in a Banach space (Argyros et a...
summary:The fundamental properties of approximate inverse systems of uniform spaces are established....
Inverse systems, inverse limit spaces, and bonding maps are defined. An investigation of the propert...
Includes bibliographical references (p. 68-69).Much is known about inverse limits of compact spaces ...
It is proved that many known convergences (e.g., continuous convergence, Isbell topology, compact-op...
V doktorski disertaciji se obravnava vprašanje ali iz konvergence grafov navzgor polzveznih veznih f...
The textbook is an alternative to a classical introductory book in point-set topology. The approach,...
AbstractIn Banič, Črepnjak, Merhar and Milutinović (2010) [2] the authors proved that if a sequence ...
AbstractRecently, Lechicki, Levi and Spakowski have studied set convergence of the Attouch–Wets type...
A central point in the theory of inverse problems is describing nearness in the data space. Based on...
In this paper, we give the definitions of statistical inner and outer limits for sequences of closed...
We prove a limit theorem for extension theory for met-ric spaces. This theorem can be put in the fol...
We consider sequences of graphs (Gn) and define various notions of convergence related to these sequ...
In [I.Banič, M. Črepnjak, M. Merhar, U. Milutinović, Limits of inverse limits, Topology Appl. 157 (2...
[[abstract]]In this paper, first we will introduce a topology into p(), power set of a set , given...
We consider an inverse-free Jarratt-type approximation of order four in a Banach space (Argyros et a...
summary:The fundamental properties of approximate inverse systems of uniform spaces are established....
Inverse systems, inverse limit spaces, and bonding maps are defined. An investigation of the propert...
Includes bibliographical references (p. 68-69).Much is known about inverse limits of compact spaces ...
It is proved that many known convergences (e.g., continuous convergence, Isbell topology, compact-op...
V doktorski disertaciji se obravnava vprašanje ali iz konvergence grafov navzgor polzveznih veznih f...
The textbook is an alternative to a classical introductory book in point-set topology. The approach,...
AbstractIn Banič, Črepnjak, Merhar and Milutinović (2010) [2] the authors proved that if a sequence ...
AbstractRecently, Lechicki, Levi and Spakowski have studied set convergence of the Attouch–Wets type...
A central point in the theory of inverse problems is describing nearness in the data space. Based on...
In this paper, we give the definitions of statistical inner and outer limits for sequences of closed...
We prove a limit theorem for extension theory for met-ric spaces. This theorem can be put in the fol...
We consider sequences of graphs (Gn) and define various notions of convergence related to these sequ...
In [I.Banič, M. Črepnjak, M. Merhar, U. Milutinović, Limits of inverse limits, Topology Appl. 157 (2...
[[abstract]]In this paper, first we will introduce a topology into p(), power set of a set , given...
We consider an inverse-free Jarratt-type approximation of order four in a Banach space (Argyros et a...