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- Completely_distributive_lattice abstract "In the mathematical area of order theory, a completely distributive lattice is a complete lattice in which arbitrary joins distribute over arbitrary meets.Formally, a complete lattice L is said to be completely distributive if, for any doubly indexed family {xj,k | j in J, k in Kj} of L, we have where F is the set of choice functions f choosing for each index j of J some index f(j) in Kj.Complete distributivity is a self-dual property, i.e. dualizing the above statement yields the same class of complete lattices.".
- Completely_distributive_lattice wikiPageID "7482029".
- Completely_distributive_lattice wikiPageRevisionID "594883671".
- Completely_distributive_lattice hasPhotoCollection Completely_distributive_lattice.
- Completely_distributive_lattice subject Category:Order_theory.
- Completely_distributive_lattice comment "In the mathematical area of order theory, a completely distributive lattice is a complete lattice in which arbitrary joins distribute over arbitrary meets.Formally, a complete lattice L is said to be completely distributive if, for any doubly indexed family {xj,k | j in J, k in Kj} of L, we have where F is the set of choice functions f choosing for each index j of J some index f(j) in Kj.Complete distributivity is a self-dual property, i.e.".
- Completely_distributive_lattice label "Completely distributive lattice".
- Completely_distributive_lattice sameAs m.02631nz.
- Completely_distributive_lattice sameAs Q5156529.
- Completely_distributive_lattice sameAs Q5156529.
- Completely_distributive_lattice wasDerivedFrom Completely_distributive_lattice?oldid=594883671.
- Completely_distributive_lattice isPrimaryTopicOf Completely_distributive_lattice.