Join and meet
In a partially ordered set P, the join and meet of a subset S are respectively the supremum (least upper bound) of S, denoted ⋁S, and infimum (greatest lower bound) of S, denoted ⋀S. In general, the join and meet of a subset of a partially ordered set need not exist; when they do exist, they are elements of P.
Join and meet can also be defined as a commutative, associative and idempotent partial binary operation on pairs of elements from P. If a and b are elements from P, the join is denoted as a ∨ b and the meet is denoted a ∧ b.
Join and meet are symmetric duals with respect to order inversion. The join/meet of a subset of a totally ordered set is simply its maximal/minimal element.
A partially ordered set in which all pairs have a join is a join-semilattice. Dually, a partially ordered set in which all pairs have a meet is a meet-semilattice. A partially ordered set that is both a join-semilattice and a meet-semilattice is a lattice. A lattice in which every subset, not just every pair, possesses a meet and a join is a complete lattice. It is also possible to define a partial lattice, in which not all pairs have a meet or join but the operations (when defined) satisfy certain axioms.[1]
Partial order approach
Let A be a set with a partial order ≤, and let x and y be two elements in A. An element z of A is the meet (or greatest lower bound or infimum) of x and y, if the following two conditions are satisfied:
- z ≤ x and z ≤ y (i.e., z is a lower bound of x and y).
- For any w in A, such that w ≤ x and w ≤ y, we have w ≤ z (i.e., z is greater than or equal to any other lower bound of x and y).
If there is a meet of x and y, then it is unique, since if both z and z′ are greatest lower bounds of x and y, then z ≤ z′ and z′ ≤ z, and thus z = z′. If the meet does exist, it is denoted x ∧ y. Some pairs of elements in A may lack a meet, either since they have no lower bound at all, or since none of their lower bounds is greater than all the others. If all pairs of elements have meets, then the meet is a binary operation on A, and it is easy to see that this operation fulfills the following three conditions: For any elements x, y, and z in A,
- a. x ∧ y = y ∧ x (commutativity),
- b. x ∧ (y ∧ z) = (x ∧ y) ∧ z (associativity), and
- c. x ∧ x = x (idempotency).
Universal algebra approach
By definition, a binary operation ∧ on a set A is a meet, if it satisfies the three conditions a, b, and c. The pair (A,∧) then is a meet-semilattice. Moreover, we then may define a binary relation ≤ on A, by stating that x ≤ y if and only if x ∧ y = x. In fact, this relation is a partial order on A. Indeed, for any elements x, y, and z in A,
- x ≤ x, since x ∧ x = x by c;
- if x ≤ y and y ≤ x, then x = x ∧ y = y ∧ x = y by a; and
- if x ≤ y and y ≤ z, then x ≤ z, since then x ∧ z = (x ∧ y) ∧ z = x ∧ (y ∧ z) = x ∧ y = x by b.
Note that both meets and joins equally satisfy this definition: a couple of associated meet and join operations yield partial orders which are the reverse of each other. When choosing one of these orders as the main ones, one also fixes which operation is considered a meet (the one giving the same order) and which is considered a join (the other one).
Equivalence of approaches
If (A,≤) is a partially ordered set, such that each pair of elements in A has a meet, then indeed x ∧ y = x if and only if x ≤ y, since in the latter case indeed x is a lower bound of x and y, and since clearly x is the greatest lower bound if and only if it is a lower bound. Thus, the partial order defined by the meet in the universal algebra approach coincides with the original partial order.
Conversely, if (A,∧) is a meet-semilattice, and the partial order ≤ is defined as in the universal algebra approach, and z = x ∧ y for some elements x and y in A, then z is the greatest lower bound of x and y with respect to ≤, since
- z ∧ x = x ∧ z = x ∧ (x ∧ y) = (x ∧ x) ∧ y = x ∧ y = z
and therefore z ≤ x. Similarly, z ≤ y, and if w is another lower bound of x and y, then w ∧ x = w ∧ y = w, whence
- w ∧ z = w ∧ (x ∧ y) = (w ∧ x) ∧ y = w ∧ y = w.
Thus, there is a meet defined by the partial order defined by the original meet, and the two meets coincide.
In other words, the two approaches yield essentially equivalent concepts, a set equipped with both a binary relation and a binary operation, such that each one of these structures determines the other, and fulfil the conditions for partial orders or meets, respectively.
Meets of general subsets
If (A,∧) is a meet-semilattice, then the meet may be extended to a well-defined meet of any non-empty finite set, by the technique described in iterated binary operations. Alternatively, if the meet defines or is defined by a partial order, some subsets of A indeed have infima with respect to this, and it is reasonable to consider such an infimum as the meet of the subset. For non-empty finite subsets, the two approaches yield the same result, whence either may be taken as a definition of meet. In the case where each subset of A has a meet, in fact (A,≤) is a complete lattice; for details, see completeness (order theory).
Notes
- ↑ Grätzer 1996, p. 52.
References
- Davey, B.A.; Priestley, H.A. (2002). Introduction to Lattices and Order (2nd ed.). Cambridge: Cambridge University Press. ISBN 0-521-78451-4. Zbl 1002.06001.
- Vickers, Steven (1989). Topology via Logic. Cambridge Tracts in Theoretic Computer Science. 5. ISBN 0-521-36062-5. Zbl 0668.54001.