Introduction. The system of axioms for set theory to be exhibited in this paper is a modification of the axiom system due to von Neumann. In particular it adopts the principal idea of von Neumann, that the elimination of the undefined notion of a property ("definite Eigenschaft”), which occurs in the original axiom system of Zermelo, can be accomplished in such a way as to make the resulting axiom system elementary, in the sense of being formalizable in the logical calculus of first order, which contains no other bound variables than individual variables and no accessory rule of inference (as, for instance, a scheme of complete induction). The purpose of modifying the von Neumann system is to remain nearer to the structure of the original Z...
Axiomatic set theory is almost universally accepted as the basic theory which provides the founda-ti...
This textbook provides a concise and self-contained introduction to mathematical logic, with a focus...
International audienceDefining a theory, such as arithmetic, geometry, or set theory, in predicate l...
Our task in the treatment of general set theory will be to give a survey for the purpose of characte...
An analysis of the well known paradoxes found in intuitive set theory has led to the reconstruction ...
It is widely known that one of the major tasks of 'Foundations' is to construct a formal system whic...
The reader of Part VI will have noticed that among the set-theoretic models considered there some mo...
This text deals with three basic techniques for constructing models of Zermelo-Fraenkel set theory: ...
Philosophical analysis of axiomatic methods goes back at least to Aristotle. In the large literature...
In this elementary paper we establish a few novel results in set theory; their interest is wholly fo...
“A set may be viewed as any well-defined collection of objects; the objects are called the elements ...
In mathematics, an explicit description of a set is a definition of a set. An explicit description i...
AbstractAn axiomatic theory of sets and rules is formulated, which permits the use of sets as data s...
The algebraic approach by E.W. Dijkstra and C.S. Scholten to formal logic is a proof calculus, where...
This is a work in the philosophy of mathematics, about some philosophical issues connected with set ...
Axiomatic set theory is almost universally accepted as the basic theory which provides the founda-ti...
This textbook provides a concise and self-contained introduction to mathematical logic, with a focus...
International audienceDefining a theory, such as arithmetic, geometry, or set theory, in predicate l...
Our task in the treatment of general set theory will be to give a survey for the purpose of characte...
An analysis of the well known paradoxes found in intuitive set theory has led to the reconstruction ...
It is widely known that one of the major tasks of 'Foundations' is to construct a formal system whic...
The reader of Part VI will have noticed that among the set-theoretic models considered there some mo...
This text deals with three basic techniques for constructing models of Zermelo-Fraenkel set theory: ...
Philosophical analysis of axiomatic methods goes back at least to Aristotle. In the large literature...
In this elementary paper we establish a few novel results in set theory; their interest is wholly fo...
“A set may be viewed as any well-defined collection of objects; the objects are called the elements ...
In mathematics, an explicit description of a set is a definition of a set. An explicit description i...
AbstractAn axiomatic theory of sets and rules is formulated, which permits the use of sets as data s...
The algebraic approach by E.W. Dijkstra and C.S. Scholten to formal logic is a proof calculus, where...
This is a work in the philosophy of mathematics, about some philosophical issues connected with set ...
Axiomatic set theory is almost universally accepted as the basic theory which provides the founda-ti...
This textbook provides a concise and self-contained introduction to mathematical logic, with a focus...
International audienceDefining a theory, such as arithmetic, geometry, or set theory, in predicate l...