eBook - ePub
Introductory Topology
Exercises and Solutions
Mohammed Hichem Mortad
This is a test
Compartir libro
- 376 páginas
- English
- ePUB (apto para móviles)
- Disponible en iOS y Android
eBook - ePub
Introductory Topology
Exercises and Solutions
Mohammed Hichem Mortad
Detalles del libro
Vista previa del libro
Índice
Citas
Información del libro
The book offers a good introduction to topology through solved exercises. It is mainly intended for undergraduate students. Most exercises are given with detailed solutions.In the second edition, some significant changes have been made, other than the additional exercises. There are also additional proofs (as exercises) of many results in the old section "What You Need To Know", which has been improved and renamed in the new edition as "Essential Background". Indeed, it has been considerably beefed up as it now includes more remarks and results for readers' convenience. The interesting sections "True or False" and "Tests" have remained as they were, apart from a very few changes.
Preguntas frecuentes
¿Cómo cancelo mi suscripción?
¿Cómo descargo los libros?
Por el momento, todos nuestros libros ePub adaptables a dispositivos móviles se pueden descargar a través de la aplicación. La mayor parte de nuestros PDF también se puede descargar y ya estamos trabajando para que el resto también sea descargable. Obtén más información aquí.
¿En qué se diferencian los planes de precios?
Ambos planes te permiten acceder por completo a la biblioteca y a todas las funciones de Perlego. Las únicas diferencias son el precio y el período de suscripción: con el plan anual ahorrarás en torno a un 30 % en comparación con 12 meses de un plan mensual.
¿Qué es Perlego?
Somos un servicio de suscripción de libros de texto en línea que te permite acceder a toda una biblioteca en línea por menos de lo que cuesta un libro al mes. Con más de un millón de libros sobre más de 1000 categorías, ¡tenemos todo lo que necesitas! Obtén más información aquí.
¿Perlego ofrece la función de texto a voz?
Busca el símbolo de lectura en voz alta en tu próximo libro para ver si puedes escucharlo. La herramienta de lectura en voz alta lee el texto en voz alta por ti, resaltando el texto a medida que se lee. Puedes pausarla, acelerarla y ralentizarla. Obtén más información aquí.
¿Es Introductory Topology un PDF/ePUB en línea?
Sí, puedes acceder a Introductory Topology de Mohammed Hichem Mortad en formato PDF o ePUB, así como a otros libros populares de Mathématiques y Mathématiques appliquées. Tenemos más de un millón de libros disponibles en nuestro catálogo para que explores.
Información
Part 1
Exercises
CHAPTER 1
General Notions: Sets, Functions et al.
1.1. Essential Background
In this section we recall some of the basic material on sets, functions, countability as well as consequences of the least upper bounded property. Other basic concepts will be assumed to be known by the reader.
1.1.1. Sets. We start with the definition of a set. We just adopt the naive definition of it as many textbooks do. We shall not go into much detail of Set Theory. It can be a quite complicated theory and a word from J. M. Møller suffices as a warning. He said in [18]: "We don’t really know what a set is but neither do the biologists know what life is and that doesn’t stop them from investigating it". So, we do advise the student to be careful when dealing with set theory in order to avoid contradictions and paradoxes. Before commencing, we give just one illustrative paradox which is the Russel’s set (from Russel’s paradox: if someone says "I’m lying", is he lying? ): Let
R = {A : A ∉ A}
be the set of all sets which are not an element of itself. So is R ∈ R? Or is it not?
DEFINITION 1.1.1. A set is a well-defined collection of objects or elements. We denote sets in general by capital letters: A, B, C; X, Y , Z, etc...Elements or objects belonging to the set are usually designated by lowercase letters: a, b, c; x, y, z, etc...
If a is an element of A, then we write: a ∈ A. Otherwise, we write that a ∉ A.
If a set does not contain any element, then it is called the empty (or void) set, and it is denoted by: ∅ or {} (J.B. Conway in [7] likes to denote it by □).
EXAMPLES 1.1.2.
(1){−4, 1, 2} is a set constituted of the elements 1, 2 and −4.
(2){x : x ≥ 0} is also a set but we cannot write down all its elements.
One element sets (e.g. {2}) have a particular name.
DEFINITION 1.1.3. A singleton is a set with exactly one element.
The notion of a "smaller" or "larger" set cannot be defined rigourously even though we will be saying it from time to time. We have a substitute.
DEFINITION 1.1.4. Let A and B be two sets.
(1)We say that A is a subset of B (or that B is a superset of A) if every element of A is an element of B, and we write
A ⊂ B or B ⊃ A.
We may also say that A is contained (or included) in B (or that B contains (or includes) A). The relation "⊂" is called inclusion.
(2)The two sets A and B are equal, and we write A = B, if
A ⊂ B and B ⊂ A.
Otherwise, we write A ≠ B.
(3)We say that A is a proper subset of B if A ⊂ B with A ≠ B. We denote this by A ⊊ B, and we call "⊊" a proper inclusion.
EXAMPLE 1.1.5. W...