Definitions from Wiktionary (De Morgan algebra)
▸ noun: (algebra, order theory) A bounded distributive lattice equipped with an involution (typically denoted ¬ or ~) which satisfies De Morgan's laws.
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▸ noun: (algebra, order theory) A bounded distributive lattice equipped with an involution (typically denoted ¬ or ~) which satisfies De Morgan's laws.
Similar:
Kleene algebra,
De Morgan's law,
Ockham algebra,
distributive lattice,
division algebra,
Boolean lattice,
zroupoid,
bounded lattice,
coalgebra,
ring,
more...
▸ Words similar to de morgan algebra
▸ Usage examples for de morgan algebra
▸ Idioms related to de morgan algebra
▸ Wikipedia articles (New!)
▸ Words that often appear near de morgan algebra
▸ Rhymes of de morgan algebra
▸ Invented words related to de morgan algebra