eBook - ePub
A Book of Set Theory
Charles C Pinter
This is a test
Compartir libro
- 256 páginas
- English
- ePUB (apto para móviles)
- Disponible en iOS y Android
eBook - ePub
A Book of Set Theory
Charles C Pinter
Detalles del libro
Vista previa del libro
Índice
Citas
Información del libro
Suitable for upper-level undergraduates, this accessible approach to set theory poses rigorous but simple arguments. Each definition is accompanied by commentary that motivates and explains new concepts. Starting with a repetition of the familiar arguments of elementary set theory, the level of abstract thinking gradually rises for a progressive increase in complexity.
A historical introduction presents a brief account of the growth of set theory, with special emphasis on problems that led to the development of the various systems of axiomatic set theory. Subsequent chapters explore classes and sets, functions, relations, partially ordered classes, and the axiom of choice. Other subjects include natural and cardinal numbers, finite and infinite sets, the arithmetic of ordinal numbers, transfinite recursion, and selected topics in the theory of ordinals and cardinals. This updated edition features new material by author Charles C. Pinter.
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 A Book of Set Theory un PDF/ePUB en línea?
Sí, puedes acceder a A Book of Set Theory de Charles C Pinter en formato PDF o ePUB, así como a otros libros populares de Mathematics y Applied Mathematics. Tenemos más de un millón de libros disponibles en nuestro catálogo para que explores.
Información
Categoría
MathematicsCategoría
Applied Mathematics1
Classes and Sets
1 BUILDING SENTENCES
Before introducing the basic notions of set theory, it will be useful to make certain observations on the use of language.
By a sentence we will mean a statement which, in a given context, is unambiguously either true or false. Thus
London is the capital of England.
Money grows on trees.
Snow is black.
are examples of sentences. We will use letters P, Q, R, S, etc., to denote sentences; used in this sense, P, for instance, is to be understood as asserting that “P is true.”
Sentences may be combined in various ways to form more complicated sentences. Often, the truth or falsity of the compound sentence is completely determined by the truth or falsity of its component parts. Thus, if P is a sentence, one of the simplest sentences we may form from P is the negation of P, denoted by ¬P (to be read “not P ”), which is understood to assert that “P is false.” Now if P is true, then, quite clearly, ¬P is false; and if P is false, then ¬P is true. It is convenient to display the relationship between ¬P and P in the following truth table,
where t and f denote the “truth values”, true and false.
Another simple operation on sentences is conjunction: if P and Q are sentences, the conjunction of P and Q, denoted by P ∧ Q (to be read “P and Q”), is understood to assert that “P is true and Q is true.” It is intuitively clear that P ∧ Q is true if P and Q are both true, and false otherwise; thus, we have the following truth table.
The disjunction of P and Q, denoted by P ∨ Q (to be read “P or Q”), is the sentence which asserts that “P is true, or Q is true, or P and Q are both true.” It is clear that P ∨ Q is false only if P and Q are both false.
An especially important operation on sentences is implication : if P and Q are sentences, then P ⇒ Q (to be read “P implies Q”) asserts that “if P is true, then Q is true.” A word of caution: in ordinary usage, “if P is true, then Q is true” is understood to mean that there is a causal relationship between P and Q (as in “if John passes the course, then John can graduate”). In mathematics, however, implication is always understood in the formal sense: P ⇒ Q is true except if P is true and Q is false. In other words, P ⇒ Q is defined by ...