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Set theory is the mathematical theory of sets, which represent collections of abstract objects. The origin of set theory can be clearly defined as the 1874 paper by Georg Cantor: "On a Characteristic Property of All Real Algebraic Numbers".Philip Johnson, 1972, A History of Set Theory, Prindle, Weber & Schmidt ISBN 0871501546 http://www-groups.dcs.st-and.ac.uk/~history/HistTopics/Beginnings_of_set_theory.html
Set theory encompasses the everyday notions, introduced in primary school, often as Venn diagrams, of collections of objects, and the elements of, and membership in, such collections. In most modern mathematical formalisms, set theory provides the language in which mathematical objects are described.
Along with logic and the predicate calculus, it is one of the axiomatic foundations for mathematics, allowing mathematical objects to be constructed formally from the undefined terms of "set" and "set membership". It is, in its own right, a branch of mathematics and an active field of mathematical research.
In naive set theory (which Cantor started) sets are introduced and understood using what is taken to be the self-evident and general concept of sets as collections of objects considered as a whole.
In axiomatic set theory (generally attributed to Ernst Zermelo and then extended by others), the concepts of sets and set membership are defined indirectly by first postulating certain axioms which specify their properties, and then developing the theory using predicate logic. In this conception, sets and set membership are fundamental concepts like point and line in Euclidean geometry, and are not themselves directly defined.
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Since its inception, there have been some mathematicians who have objected to using set theory as a foundation for mathematics, claiming that it is just a game which includes elements of fantasy. Errett Bishop dismissed set theory as "God\'s mathematics, which we should leave for God to do." Also Ludwig Wittgenstein questioned especially the handling of infinities, which concerns also ZF. Wittgenstein\'s views about foundations of mathematics have been criticised by Paul Bernays, and closely investigated by Crispin Wright, among others.
The most frequent objection to set theory is the constructivist view that mathematics is loosely related to computation and that naive set theory is being formalised with the addition of noncomputational elements.
Topos theory has been proposed as an alternative to traditional axiomatic set theory. Topos theory can be used to interpret various alternatives to set theory such as constructivism, finite set theory, and computable set theory.
Despite the objections, set theory remain a key part of mathematical thought and the famous mathematician David Hilbert said: "No one shall expel us from the Paradise that Cantor has created."Constance Reid, 1996, Hilbert, New York: Springer-Verlag. ISBN 0387049991
Wikibooks has a book on the topic of
Wikibooks has a book on the topic of
Discrete mathematics/Set theory
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