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pointed domain

In most formulations of domain theory, a domain is defined to have a bottom element and algebraic CPOs without bottoms are called "predomains". David Schmidt' s domains do not have this requirement and he calls a domain with a bottom "pointed". (1999-07-07)

In addition suitable contents:
[ = ] [ ai ] [ al ] [ algebra ] [ algebraic ] [ am ] [ an ] [ ar ] [ arc ] [ at ] [ av ] [ b ] [ bo ] [ bot ] [ bottom ] [ br ] [ C ] [ ca ] [ ch ] [ chm ] [ CP ] [ D ] [ de ] [ do ] [ domain ] [ domain theory ] [ du ] [ ed ] [ element ] [ er ] [ fi ] [ file ] [ fo ] [ for ] [ formula ] [ ge ] [ h ] [ hm ] [ hr ] [ id ] [ il ] [ in ] [ int ] [ io ] [ ir ] [ is ] [ it ] [ la ] [ Lex ] [ ls ] [ ma ] [ mo ] [ mod ] [ module ] [ ms ] [ mu ] [ na ] [ ne ] [ no ] [ ns ] [ O ] [ om ] [ ph ] [ point ] [ pr ] [ predomain ] [ query ] [ rc ] [ re ] [ S ] [ se ] [ st ] [ th ] [ theory ] [ to ] [ tt ] [ ve ] [ vi ]

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