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Non-Well-Founded Sets Peter Aczel
Non-well-founded structures arise in a variety of ways in the semantics of both natural and formal languages. Two examples are non-well-founded situations and non-terminating computational processes. A natural modelling of such structures in set theory requires the use of non-well-founded sets. This text presents the mathematical background to the anti-foundation axiom and related axioms that imply the existence of non-well-founded sets when used in place of the axiom of foundation in axiomatic set theory.
5/1/88 ISBN (Paperback): 0937073229 ISBN (Cloth): 0937073210 Subject: Mathematics; Axiomatic Set Theory | 
Distributed by the
University of
Chicago Press |
