Definitions from Wiktionary (semilattice)
▸ noun: (mathematics) A partially ordered set that either has a join (a least upper bound) for any nonempty finite subset (a join-semilattice or upper semilattice) or has a meet (or greatest lower bound) for any nonempty finite subset (a meet-semilattice or lower semilattice). Equivalently, an underlying set which has a binary operation which is associative, commutative, and idempotent.
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▸ noun: (mathematics) A partially ordered set that either has a join (a least upper bound) for any nonempty finite subset (a join-semilattice or upper semilattice) or has a meet (or greatest lower bound) for any nonempty finite subset (a meet-semilattice or lower semilattice). Equivalently, an underlying set which has a binary operation which is associative, commutative, and idempotent.
Similar:
uppersemilattice,
complete lattice,
subuppersemilattice,
bilattice,
ideal,
hypersemigroup,
lattice,
semialgebra,
bounded lattice,
sublattice,
more...
▸ Words similar to semilattice
▸ Usage examples for semilattice
▸ Idioms related to semilattice
▸ Wikipedia articles (New!)
▸ Popular adjectives describing semilattice
▸ Words that often appear near semilattice
▸ Rhymes of semilattice
▸ Invented words related to semilattice