semilattice |
tree |
As nouns the difference between semilattice and tree
is that
semilattice is (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 ) while
tree is a large plant, not exactly defined, but typically over four meters in height, a single trunk which grows in girth with age and branches (which also grow in circumference with age).
As a verb tree is
to chase (an animal or person) up a tree.
taxonomy |
semilattice |
As nouns the difference between taxonomy and semilattice
is that
taxonomy is the science or the technique used to make a classification while
semilattice is (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 ).