Ideals in Stone-Cech compactifications

Toko, Wilson Bombe

04 April 2013

A thesis submitted in ful llment of the requirements for the degree of Doctor of Philosophy in Mathematics School of Mathematics University of the Witwatersrand Johannesburg October, 2012 / Let S be an in nite discrete semigroup and S the Stone- Cech compacti cation of S. The operation of S naturally extends to S and makes S a compact right topological semigroup with S contained in the topological center of S. The aim of this thesis is to present the following new results. 1. If S embeddable in a group, then S contains 22jSj pairwise incomparable semiprincipal closed two-sided ideals. 2. Let S be an in nite cancellative semigroup of cardinality and U(S) the set of uniform ultra lters on S. If > !, then there is a closed left ideal decomposition of U(S) such that the corresponding quotient space is homeomorphic to U( ). If = !, then for any connected compact metric space X, there is a closed left ideal decomposition of U(S) with the quotient space homeomorphic to X.

Stone-Cech compactification.

Ações de semigrupos : recorrencia por cadeias em fibrados e compactificações de Ellis / Semigroup actions : Chan recurrence in fiber Bundles and Ellis compactifications

Souza, Josiney Alves de

15 July 2008

Orientador: Luiz Antonio Barrera San Martin / Tese (doutorado) - Universidade Estadual de Campinas, Instituto de Matematica, Estatistica e Computação Cientifica / Made available in DSpace on 2018-08-11T09:58:09Z (GMT). No. of bitstreams: 1 Souza_JosineyAlvesde_D.pdf: 1777083 bytes, checksum: 43943f3a9ea228d0eb5fbe6c6906cd93 (MD5) Previous issue date: 2008 / Resumo: Um semigrupo de transformação consiste de um semigrupo de aplicações contínuas definidas num espaço topológico. A hipótese sobre o semigrupo é a propriedade de reversibilidade, isto é, que a coleção das translações do semigrupo satisfaz a propriedade de intersecção finita. A idéia central é de dinamizar um semigrupo de transformação, sendo isto realizado pela introdução dos correspondentes objetos dinâmicos elementares da teoria de semifluxos, ou seja, os conjuntos limites, atratores e repulsores. O conceito de recorrência por cadeias é abordado de uma forma generalizada, sobre espaços paracompactos, tendo como fundamento certas famílias especiais de coberturas abertas do espaço base chamadas famílias admissíveis. Estudamos também ações de grupos de homeomorfismos sobre espaços compactos. Neste caso, a hipótese sobre o grupo é que ele seja gerado por um subsemigrupo reversível, a partir do qual são definidos todos os objetos dinâmicos elementares. Estudamos dois casos específicos de semigrupos de transformações. No primeiro caso, abordamos semigrupos de transformações em fibrados topológicos, especialmente em fibrados flag, e enfatizamos o estudo sobre transitividade por cadeias fibra a fibra. No segundo caso, estudamos ações de grupos sobre compactificações de Ellis, onde apresentamos uma relação entre o conceito de subsemigrupo semitotal e a transitividade por cadeias. Por último, introduzimos o conceito de função recorrente por cadeias, generalizando o conceito de função recorrente. / Abstract: Transformation semigroups are actions of semigroups of continuous maps on topological spaces. We consider reversible semigroups and study dynamics behaviors by introducing the elementary dynamic objects, originals of the semiflows theory, that is, the limit sets, attractors and repellers. We present the concept of chain recurrence for admissible families on paracompact spaces. We also study homeomorphism group action on compact spaces. In this case, the hypothesis on the group is the Ore's condictions. The elementary dynamics objects are defined from the action of the generator reversible subsemigroup. Then we study two specific cases of transformation semigroups. In the first case, we present results on the actions of endomorphism in flag bundles by emphasizing the chain transitivity in the fibres. Next, we study group actions in Ellis compactifications and relate the concept of semitotal subsemigroup to the chain transitivity. Finally, we introduce the concept of chain recurrent function and generalize the concept of recurrent function. / Doutorado / Geometria / Doutor em Matemática

Semigrupos

Dinâmica

Fibrados (Matemática)

Stone-Cech, Compactificação de

Semigrou

Dynamical systems

Fiber bundles

Stone-Cech compactification

Remainders and Connectedness of Ordered Compactifications

Karatas, Sinem Ayse

29 May 2012

The aim of this thesis is to establish the principal properties for the theory of ordered compactifications relating to connectedness and to provide particular examples. The initial idea of this subject is based on the notion of the Stone-Cech compactification.The ordered Stone-Cech compactification oX of an ordered topological space X is constructed analogously to the Stone-Cech compactification X of a topological space X, and has similar properties. This technique requires a conceptual understanding of the Stone-Cech compactification and how its product applies to the construction of ordered topological spaces with continuous increasing functions. Chapter 1 introduces background information. Chapter 2 addresses connectedness and compactification. If (A;B) is a separation ofa topological space X, then (A 8 B) = A 8 B, but in the ordered setting, o(A 8 B)need not be oA 8 oB. We give an additional hypothesis on the separation (A;B) tomake o(A 8 B) = oA 8 oB. An open question in topology is when is X -X = X. Weanswer the analogous question for ordered compactifications of totally ordered spaces. So, we are concerned with the remainder, that is, the set of added points oX -X. Wedemonstrate the topological properties by using lters. Moreover, results of lattice theory turn out to be some of the basic tools in our original approach. In Chapter 3, specific examples and counterexamples are given to illustrate earlierresults.

Ordered Stone-Cech compactifications

Ordered topological spaces

Mathematics

Aneis de funções continuas

Berrios Yana, Sonia Sarita

03 August 2018

Orientador : Jorge Tulio Mujica Ascui / Dissertação (mestrado) - Universidade Estadual de Campinas, Instituto de Matematica, Estatistica e Computação Cientifica / Made available in DSpace on 2018-08-03T00:54:22Z (GMT). No. of bitstreams: 1 BerriosYana_SoniaSarita_M.pdf: 612885 bytes, checksum: 4c9255f82f97ebff9bb4066cb888eb44 (MD5) Previous issue date: 2003 / Mestrado / Mestre em Matemática

Funções contínuas

Stone-Cech, Compactificação de

Hewitt-Nachbin, Espaços de

Ultrafilters and Compactification

Nxumalo, Mbekezeli Sibahle

January 2020

>Magister Scientiae - MSc / In this thesis, we construct the ultrafilter space of a topological space using ultrafilters as points, study some of its properties and describe a method of generating compactifications through the ultrafilter space. As part of investigating some properties of the ultrafilter space, we show that the ultrafilter space forms a monad in the category of topological spaces. Furthermore, we show that rendering the ultrafilter space suitably separated results in a generation of separated compactifications which coincide with some well-known compactifications. When the ultrafilter space is rendered T0 or sober, the resulting compactifications is a stable Compactifications. Rendering the ultrafilter space T2 or Tychono results in the Stone_ Cechcompactification

Ultra filter space

Compactification

Reflection

Monad

Stable Compactifi cation

Stone- Cech

Compactification

Συμπαγείς τοπολογικοί χώροι και συμπαγοποιήσεις

Πετρόπουλος, Βασίλειος

07 October 2011

Στα δύο πρώτα κεφάλαια γίνεται μια ιστορική αναδρομή και αναφέρονται όλες οι απαραίτητες εισαγωγικές έννοιες που χρειάζονται έτσι, ώστε να γίνει απρόσκοπτα και χωρίς ασάφειες το κυρίως μέρος της εργασίας. Στο κεφάλαιο τρία περιγράφονται και αναλύονται οι συμπαγείς τοπολογικοί χώροι. Κατά σειρά εξετάζονται οι συμπαγείς χώροι, οι συνεχείς απεικονίσεις πάνω σε συμπαγείς χώρους και τέλος οι τοπικά συμπαγείς χώροι. Επίσης περιγράφονται έννοιες συναφείς με τη συμπάγεια. Στο τέταρτο και τελευταίο κεφάλαιο ορίζεται η έννοια της συμπαγοποίησης ενός τοπολογικού χώρου και μελετώνται κατά σειρά η συμπαγοποίηση ενός σημείου, η συμπαγοποίηση Stone – Čech και η Wallman-type συμπαγοποίηση. / We study compact topological spaces. We also describe the compactification of a topological space. Especially we describe the Alexandroff, Stone-Cech and Wallman type compactifications.

Συμπαγείς χώροι

Συμπαγοποίηση

Τοπολογία

514.32

Compact spaces

Compactification

Topology

One point compactification

Stone-Cech

Wallman-type

Ordered spaces of continuous functions and bitopological spaces

Nailana, Koena Rufus

11 1900

This thesis is divided into two parts: Ordered spaces of Continuous Functions and the algebras associated with the topology of pointwise convergence of the associated construct, and Strictly completely regular bitopological spaces. The Motivation for part of the first part (Chapters 2, 3 and 4) comes from the recent study of function spaces for bitopological spaces in [44] and [45]. In these papers we see a clear generalisation of classical results in function spaces ( [14] and [55]) to bi-topological spaces. The well known definitions of the pointwise topology and the compact open topology in function spaces are generalized to bitopological spaces, and then familiar results such as Arens' theorem are generalised. We will use the same approach in chapters 2, 3 and 4 to formulate analogous definitions in the setting of ordered spaces. Well known results, including Arens' theorem, are also generalised to ordered spaces. In these chapters we will also compare function spaces in the category of topological spaces and continuous functions, the category of bi topological spaces and bicontinuous functions, and the category of ordered topological spaces and continuous order-preserving functions. This work has resulted in the publication of [30] and [31]. Continuing our study of Function Spaces, we oonsider in Chapters 5 and 6 some Categorical aspects of the construction, motivated by a series of papers which includes [39], [40], [41] and [50]. In these papers the Eilenberg-Moore Category of algebras of the monad induced by the Hom-functor on the categories of sets and categories of topological spaces are classified. Instead of looking at the whole product topology we will restrict ourselves to the pointwise topology and give examples of the EilenbergMoore Algebras arising from this restriction. We first start by way of motivation, with the discussion of the monad when the range space is the real line with the usual topology. We then restrict our range space to the two point Sierpinski space, with the aim of discovering a topological analogue of the well known characterization of Frames as the Eilenberg-Moore Category of algebras associated with the Hom-F\mctor of maps into the Sierpinski space [11]. In this case the order structure features prominently, resulting in the category Frames with a special property called "balanced" and Frame homomorphisms as the Eilenberg-Moore category of M-algebras. This has resulted in [34]. The Motivation for the second part comes from [20] and [15]. In [20], J. D. Lawson introduced the notion of strict complete regularity in ordered spaces. A detailed study of this notion was done by H-P. A. Kiinzi in [15]. We shall introduce an analogous notion for bitopological spaces, and then shall also compare the two notions in the categories of bi topological spaces and bicontinuous functions, and of ordered topological spaces and continuous order-preserving functions via the natural functors considered in the previous chapters. We further study the Stone-Cech bicompactification and Stone-Cech ordered compactification in the two categories. This has resulted in [32] and [33] / Mathematical Sciences / D. Phil. (Mathematics)

Ordered topological spaces

Bitopological spaces

Strictly completely regular bispaces

Stone-Cech bicompactification

Stone-Cech ordered compactification

Quasi-uniform spaces

Eilenberg-Moore algebras

512.55

Topological algebras

Topological spaces

Stone-Cech compactification

Quasi-uniform spaces

Eilenberg-Moore spectral sequences

Ordered topological spaces