Title :
Non-well-founded sets obtained from ideal fixed points
Author :
Mislove, Michael W. ; Moss, Lawrence S. ; Oles, Frank J.
Author_Institution :
Dept. of Math., Tulane Univ., New Orleans, LA, USA
Abstract :
Motivated by ideas from the study of abstract data types, the authors show how to interpret non-well-founded sets as fixed points of continuous transformations of an initial continuous algebra. They consider a preordered structure closely related to the set HF of well-founded, hereditarily finite sets. By taking its ideal completion, the authors obtain an initial continuous algebra in which they are able to solve all of the usual systems of equations that characterize hereditarily finite, non-well-founded sets. In this way, they are able to obtain a structure which is isomorphic to HF1, the non-well-founded analog to HF
Keywords :
set theory; HF1; abstract data types; anti-foundation axiom; continuous transformations; fixed points; hereditarily finite sets; initial continuous algebra; non-well-founded sets; preordered structure; protosets; Algebra; Calculus; Context modeling; Distributed computing; Equations; Etching; Hafnium; Mathematics; Prototypes; Set theory;
Conference_Titel :
Logic in Computer Science, 1989. LICS '89, Proceedings., Fourth Annual Symposium on
Conference_Location :
Pacific Grove, CA
Print_ISBN :
0-8186-1954-6
DOI :
10.1109/LICS.1989.39181
