In the mathematical area of

order theory Order theory is a branch of mathematics that investigates the intuitive notion of order using binary relations. It provides a formal framework for describing statements such as "this is less than that" or "this precedes that". This article intr ...

, a completely distributive lattice is a

complete lattice In mathematics, a complete lattice is a partially ordered set in which ''all'' subsets have both a supremum (join) and an infimum (meet). A lattice which satisfies at least one of these properties is known as a ''conditionally complete lattice.'' ...

in which arbitrary

join Join may refer to: * Join (law), to include additional counts or additional defendants on an indictment *In mathematics: ** Join (mathematics), a least upper bound of sets orders in lattice theory ** Join (topology), an operation combining two topo ...

s distribute over arbitrary meets. Formally, a complete lattice ''L'' is said to be completely distributive if, for any doubly indexed family of ''L'', we have :

\bigwedge_\bigvee_ x_ = 
         \bigvee_\bigwedge_ x_

where ''F'' is the set of

choice function A choice function (selector, selection) is a mathematical function ''f'' that is defined on some collection ''X'' of nonempty sets and assigns some element of each set ''S'' in that collection to ''S'' by ''f''(''S''); ''f''(''S'') maps ''S'' to ...

s ''f'' choosing for each index ''j'' of ''J'' some index ''f''(''j'') in ''K''_''j''.B. A. Davey and H. A. Priestley, ''

Introduction to Lattices and Order ''Introduction to Lattices and Order'' is a mathematical textbook on order theory by Brian A. Davey and Hilary Priestley. It was published by the Cambridge University Press in their Cambridge Mathematical Textbooks series in 1990, with a second ...

'' 2nd Edition, Cambridge University Press, 2002, , 10.23 Infinite distributive laws, pp. 239–240 Complete distributivity is a self-dual property, i.e. dualizing the above statement yields the same class of complete lattices. Without the axiom of choice, no complete lattice with more than one element can ever satisfy the above property, as one can just let ''x''_''j'',''k'' equal the top element of ''L'' for all indices ''j'' and ''k'' with all of the sets ''K''_''j'' being nonempty but having no choice function.

Alternative characterizations

Various different characterizations exist. For example, the following is an equivalent law that avoids the use of choice functions. For any set ''S'' of sets, we define the set ''S''^# to be the set of all subsets ''X'' of the complete lattice that have non-empty intersection with all members of ''S''. We then can define complete distributivity via the statement :

\begin\bigwedge \ = \bigvee\\end

The operator ( )^# might be called the crosscut operator. This version of complete distributivity only implies the original notion when admitting the

Axiom of Choice In mathematics, the axiom of choice, or AC, is an axiom of set theory equivalent to the statement that ''a Cartesian product of a collection of non-empty sets is non-empty''. Informally put, the axiom of choice says that given any collection ...

Properties

In addition, it is known that the following statements are equivalent for any complete lattice ''L'':G. N. Raney,
A subdirect-union representation for completely distributive complete lattices
', Proceedings of the American Mathematical Society, 4: 518 - 522, 1953. * ''L'' is completely distributive. * ''L'' can be embedded into a direct product of chains ,1by an

order embedding In order theory, a branch of mathematics, an order embedding is a special kind of monotone function, which provides a way to include one partially ordered set into another. Like Galois connections, order embeddings constitute a notion which is s ...

that preserves arbitrary meets and joins. * Both ''L'' and its dual order ''L''^op are

continuous poset In order theory, a continuous poset is a partially ordered set in which every element is the directed supremum of elements approximating it. Definitions Let a,b\in P be two elements of a preordered set (P,\lesssim). Then we say that a approximat ...

s. Direct products of ,1 i.e. sets of all functions from some set ''X'' to ,1ordered

pointwise In mathematics, the qualifier pointwise is used to indicate that a certain property is defined by considering each value f(x) of some function f. An important class of pointwise concepts are the ''pointwise operations'', that is, operations defined ...

, are also called ''cubes''.

Free completely distributive lattices

Every

poset In mathematics, especially order theory, a partially ordered set (also poset) formalizes and generalizes the intuitive concept of an ordering, sequencing, or arrangement of the elements of a set. A poset consists of a set together with a binary r ...

''C'' can be completed in a completely distributive lattice. A completely distributive lattice ''L'' is called the free completely distributive lattice over a poset ''C'' if and only if there is an

\phi:C\rightarrow L

such that for every completely distributive lattice ''M'' and

monotonic function In mathematics, a monotonic function (or monotone function) is a function between ordered sets that preserves or reverses the given order. This concept first arose in calculus, and was later generalized to the more abstract setting of order ...

f:C\rightarrow M

, there is a unique complete homomorphism

f^*_\phi:L\rightarrow M

satisfying

f=f^*_\phi\circ\phi

. For every poset ''C'', the free completely distributive lattice over a poset ''C'' exists and is unique up to isomorphism.Joseph M. Morris,
Augmenting Types with Unbounded Demonic and Angelic Nondeterminacy
', Mathematics of Program Construction, LNCS 3125, 274-288, 2004 This is an instance of the concept of

free object In mathematics, the idea of a free object is one of the basic concepts of abstract algebra. Informally, a free object over a set ''A'' can be thought of as being a "generic" algebraic structure over ''A'': the only equations that hold between eleme ...

. Since a set ''X'' can be considered as a poset with the discrete order, the above result guarantees the existence of the free completely distributive lattice over the set ''X''.

Examples

* The

unit interval In mathematics, the unit interval is the closed interval , that is, the set of all real numbers that are greater than or equal to 0 and less than or equal to 1. It is often denoted ' (capital letter ). In addition to its role in real analysis ...

,1 ordered in the natural way, is a completely distributive lattice.G. N. Raney, ''Completely distributive complete lattices'', Proceedings of the

American Mathematical Society The American Mathematical Society (AMS) is an association of professional mathematicians dedicated to the interests of mathematical research and scholarship, and serves the national and international community through its publications, meeting ...

, 3: 677 - 680, 1952. **More generally, any complete chain is a completely distributive lattice.Alan Hopenwasser, ''Complete Distributivity'', Proceedings of Symposia in Pure Mathematics, 51(1), 285 - 305, 1990. * The

power set In mathematics, the power set (or powerset) of a set is the set of all subsets of , including the empty set and itself. In axiomatic set theory (as developed, for example, in the ZFC axioms), the existence of the power set of any set is post ...

lattice

(\mathcal{P}(X),\subseteq)

for any set ''X'' is a completely distributive lattice. * For every poset ''C'', there is a ''free completely distributive lattice over C''. See the section on Free completely distributive lattices above.

References

Order theory

Alternative characterizations

Properties

Free completely distributive lattices

Examples

See also

References