foundation
The axiom of foundation state s that the member ship relation i s well founded, i.e. that any non-empty collection Y of set s ha s a member y which i s di sjoint from Y. Thi s rule s out set s which contain them selve s (directly or indirectly). style="border-width:thin; border-color:#333333; border-style:dashed; padding:5px;" align="left">In addition suitable contents: [ ai ] [ an ] [ as ] [ at ] [ axiom ] [ b ] [ be ] [ ch ] [ co ] [ con ] [ de ] [ ec ] [ ed ] [ er ] [ es ] [ et ] [ fo ] [ fr ] [ h ] [ hat ] [ in ] [ int ] [ io ] [ ir ] [ is ] [ jo ] [ join ] [ la ] [ lv ] [ ly ] [ mp ] [ ms ] [ no ] [ om ] [ pt ] [ re ] [ relation ] [ ro ] [ rsh ] [ ru ] [ se ] [ set ] [ sh ] [ sj ] [ st ] [ state ] [ T ] [ th ] [ ve ] [ Y ]
[ Go Back ]
Free On-line Dictionary of Computing Copyright © by OnlineWoerterBuecher.de - (1985 Reads) |