An accessible pointed graph is a directed graph with a distinguished vertex (the "root") such that for any node in the graph there is at least one path in the directed graph from the root to that node.
The anti-foundation axiom postulates that each such directed graph corresponds to the membership structure of exactly one set. For example, the directed graph with only one node and an edge from that node to itself corresponds to a set of the form x = {x}.
Aczel, Peter (1988). Non-well-founded sets. CSLI Lecture Notes. Vol. 14. Stanford, CA: Stanford University, Center for the Study of Language and Information. ISBN978-0-937073-22-3. MR 0940014. Retrieved 2008-03-12.
Goertzel, Ben (1994). "Self-Generating Systems". Chaotic Logic: Language, Thought and Reality From the Perspective of Complex Systems Science. Plenum Press. ISBN978-0-306-44690-0. Retrieved 2007-01-15.
Akman, Varol; Pakkan, Mujdat (1996). "Nonstandard set theories and information management" (PDF). Journal of Intelligent Information Systems. 6 (1): 5–31. CiteSeerX10.1.1.49.6800. doi:10.1007/BF00712384.
October 20, 2023
aczel, anti, foundation, axiom, this, article, needs, additional, citations, verification, please, help, improve, this, article, adding, citations, reliable, sources, unsourced, material, challenged, removed, find, sources, news, newspapers, books, scholar, js. This article needs additional citations for verification Please help improve this article by adding citations to reliable sources Unsourced material may be challenged and removed Find sources Aczel s anti foundation axiom news newspapers books scholar JSTOR April 2017 Learn how and when to remove this template message In the foundations of mathematics Aczel s anti foundation axiom is an axiom set forth by Peter Aczel 1988 as an alternative to the axiom of foundation in Zermelo Fraenkel set theory It states that every accessible pointed directed graph corresponds to exactly one set In particular according to this axiom the graph consisting of a single vertex with a loop corresponds to a set that contains only itself as element i e a Quine atom A set theory obeying this axiom is necessarily a non well founded set theory Accessible pointed graphs EditAn accessible pointed graph is a directed graph with a distinguished vertex the root such that for any node in the graph there is at least one path in the directed graph from the root to that node The anti foundation axiom postulates that each such directed graph corresponds to the membership structure of exactly one set For example the directed graph with only one node and an edge from that node to itself corresponds to a set of the form x x See also Editvon Neumann universeReferences EditAczel Peter 1988 Non well founded sets CSLI Lecture Notes Vol 14 Stanford CA Stanford University Center for the Study of Language and Information ISBN 978 0 937073 22 3 MR 0940014 Retrieved 2008 03 12 Goertzel Ben 1994 Self Generating Systems Chaotic Logic Language Thought and Reality From the Perspective of Complex Systems Science Plenum Press ISBN 978 0 306 44690 0 Retrieved 2007 01 15 Akman Varol Pakkan Mujdat 1996 Nonstandard set theories and information management PDF Journal of Intelligent Information Systems 6 1 5 31 CiteSeerX 10 1 1 49 6800 doi 10 1007 BF00712384 Retrieved from https en wikipedia org w index php title Aczel 27s anti foundation axiom amp oldid 1108320038, wikipedia, wiki, book, books, library,
