Question

Give an example for a partially ordered set which is not a lattice.

Answer 1

Answer:

The set {x,y} in which x and y are incomparable is a poset that is not a lattice, since x and y have neither a common lower nor common upper bound. (In fact, this is the simplest such example.) .This is a poset, but not a lattice since {0} and {1} have no common upper bound.

Answer 2

Answer:

it is the state for a partially ordered which is not include availability and accessibility