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KOVÁR, M.
Original Title
On iterated de Groot dualizations of topological spaces
Type
journal article - other
Language
English
Original Abstract
Problem 540 of J. D. Lawson and M. Mislove in Open Problems in Topology ask whether the process of taking (de Groot) duals terminate after finitely many steps with topologies that are duals of each other. The question was solved in the positive by the author in 2001. In this paper we prove a new identity for dual topologies: $\tau^d= (\tau\vee\tau^{dd})^d$ holds for every topological space $(X,\tau)$. We also present a solution of another problem that was open till now -- we give an equivalent internal characterization of those spaces for which $\tau=\tau^{dd}$ and we also characterize the spaces satisfying the identities $\tau^d=\tau^{ddd}$, $\tau=\tau^{d}$ and $\tau^d=\tau^{dd}$.
Keywords
saturated set, dual topology, compactness operator
Authors
RIV year
2005
Released
1. 1. 2005
ISBN
0166-8641
Periodical
Topology and its Applications
Year of study
1
Number
146-7
State
Kingdom of the Netherlands
Pages from
83
Pages to
89
Pages count
7
BibTex
@article{BUT46466, author="Martin {Kovár}", title="On iterated de Groot dualizations of topological spaces", journal="Topology and its Applications", year="2005", volume="1", number="146-7", pages="7", issn="0166-8641" }