order theory
Order theory is a branch of
mathematics that studies various kinds of
binary relations that capture the intuitive notion of ordering, providing a framework for saying when one thing is "less than" or "precedes" another. This article gives a detailed introduction to the field and includes some of the most basic definitions. For a quick lookup of order-theoretic terms, there is also an
order theory glossary. A
list of order topics collects the various articles in the vicinity of order theory.
Background and motivation
Orders appear everywhere - at least as far as mathematics and related areas, such as
computer science, are concerned. The first order that one typically meets in
primary school mathematical education is the order ≤ of
natural numbers. This intuitive concept is easily extended to orderings of other sets of
numbers, such as the
integers and the
reals. Indeed the idea of being greater or smaller than another number is one of the basic intuitions of number systems in general (although one usually is also interested in the actual
difference of two numbers, which is not given by the order). Another familiar example of an ordering is the
lexicographic order of words in a dictionary.The above types of orders have a special property: each element can be
compared to any other element, i.e. it is greater, smaller, or equal. However, this is not always a desired requirement. For example, consider the
subset ordering of
sets. If a set
A contains all the elements of a set
B, then
B is said to be smaller than or equal to
A. Yet there are some sets that cannot be related in this fashion. Whenever both contain some elements that are not in the other, the two sets are not related by subset-inclusion. Hence, subset-inclusion is only a
partial order, as opposed to the
total orders given before.Order theory captures the intuition of orders that arises from such examples in a general setting. This is achieved by specifying properties that a
relation ≤ must have to be a mathematical order. This more abstract approach makes much sense, because one can derive numerous theorems in the general setting, without focusing on the details of any particular order. These insights can then be readily transferred to many less abstract applications.Driven by the wide practical usage of orders, numerous special kinds of ordered sets have been defined, some of which have grown into mathematical fields of their own. In addition, order theory does not restrict itself to the various classes of ordering relations, but also considers appropriate
functions between them. A simple example of an order theoretic property for functions comes from
analysis where
monotone functions are frequently found.
Basic definitions
This section introduces ordered sets by building upon the concepts of
set theory,
arithmetic, and
binary relations.
Partially ordered sets Orders are special binary relations. Suppose that P is a set and that ≤ is a relation on P. Then ≤ is a partial order if it is reflexive, antisymmetric, and transitive, i.e., for all a, b and c in P, we have that:
a ≤ a (reflexivity)
if a ≤ b and b ≤ a then a = b (antisymmetry)
if a ≤ b and b ≤ c then a ≤ c (transitivity)
A set with a
partial order on it is called a
partially ordered set,
poset, or just an
ordered set if the intended meaning is clear. By checking these properties, one immediately sees that the well-known orders on
natural numbers,
integers,
rational numbers and
reals are all orders in the above sense. However, they have the additional property of being
total, i.e., for all
a and
b in
P, we have that:
a ≤ b or b ≤ a (totality)
These orders can also be called
linear orders or
chains. While many classical orders are linear, the
subset order on sets provides an example where this is not the case. Another example is given by the divisibility relation "|". For two natural numbers
n and
m, we write
n|
m if
n divides m without remainder. One easily sees that this yields a partial order.The identity relation = on any set is also a partial order in which every two distinct elements are incomparable. It is also the only relation that is both a partial order and an
equivalence relation. Many advanced properties of posets are mainly interesting for non-linear orders.
Visualizing a poset
Image:Lattice of the divisibility of 60.svg|thumb|right|250px|
Hasse diagramHasse diagramHasse diagrams can visually represent the elements and relations of a partial ordering. These are
graph drawings where the
vertices are the elements of the poset and the ordering relation is indicated by both the
edges and the relative positioning of the vertices. Orders are drawn bottom-up: if an element
x is smaller than (precedes)
y then there exists a path from
x to
y that is directed upwards. It is often necessary for the edges connecting elements to cross each other, but elements must never be located within an edge. An instructive exercise is to draw the Hasse diagram for the set of natural numbers that are smaller than or equal to 13, ordered by | (the
divides relation).Even some infinite sets can be diagrammed by superimposing an
ellipsis (...) on a finite sub-order. This works well for the natural numbers, but it fails for the reals, where there is no immediate successor above 0. However, quite often one can obtain an intuition related to diagrams of a similar kind.
Special elements within an order
In a partially ordered set there may be some elements that play a special role. The most basic example is given by the
least element of a poset. For example, 1 is the
least element of the positive integers and the
empty set is the least set under the subset order. Formally, an element
m is a least element if:
m ≤ a, for all elements a of the order.
The notation 0 is frequently found for the least element, even when no numbers are concerned. However, in orders on sets of numbers, this notation might be inappropriate or ambiguous, since the number 0 is not always least. An example is given by the above divisibility order |, where 1 is the least element since it divides all other numbers. On the other hand, 0 is the number that is divided by all other numbers. Hence it is the
greatest element of the order. Other frequent terms for the least and greatest elements is
bottom and
top or
zero and
unit. Least and
greatest elements may fail to exist, as the example of the real numbers shows.On the other hand, if they exist, least and greatest elements are always unique. In contrast, consider the divisibility relation | on the set {2,3,4,5,6}. Although this set has neither top nor bottom, the elements 2, 3, and 5 do not have any elements below them, while 4, 5, and 6 have no other number above. Such elements are called
minimal and
maximal, respectively. Formally, an element
m is
minimal if:
a ≤ m implies a = m, for all elements a of the order.
Exchanging ≤ with ≥ yields the definition of
maximality. As the example shows, there can be many maximal elements and some elements may be both maximal and minimal (e.g. 5 above). However, if there is a least element, then it is the only minimal element of the order. Again, in infinite posets maximal elements do not always exist - the set of all
finite subsets of a given infinite set, ordered by subset inclusion, provides one out of many counterexamples. An important tool to ensure the existence of maximal elements under certain conditions is
Zorn's Lemma.Subsets of partially ordered sets inherit the order. We already applied this by considering the subset {2,3,4,5,6} of the natural numbers with the induced divisibility ordering. Now there are also elements of a poset that are special with respect to some subset of the order. This leads to the definition of
upper bounds. Given a subset
S of some poset
P, an upper bound of
S is an element
b of
P that is above all elements of
S. Formally, this means that
s ≤ b, for all s in S.
Lower bounds again are defined by inverting the order. For example, -5 is a lower bound of the natural numbers as a subset of the integers. Given a set of sets, an upper bound for these sets under the subset ordering is given by their
union. In fact, this upper bound is quite special: it is the smallest set that contains all of the sets. Hence, we have found the
least upper bound of a set of sets. This concept is also called
supremum or
join, and for a set
S one writes sup(
S) or v
S for its least upper bound. Conversely, the
greatest lower bound is known as
infimum or
meet and denoted inf(
S) or ^
S. These concepts play an important role in many applications of order theory. For two elements
x and
y, one also writes
x v
y and
x ^
y for sup({
x,
y}) and inf({
x,
y}), respectively. For another example, consider again the relation | on natural numbers. The least upper bound of two numbers is the smallest number that is divided by both of them, i.e. the
least common multiple of the numbers. Greatest lower bounds in turn are given by the
greatest common divisor.
Duality
In the previous definitions, we often noted that a concept can be defined by just inverting the ordering in a former definition. This is the case for "least" and "greatest", for "minimal" and "maximal", for "upper bound" and "lower bound", and so on. This is a general situation in order theory: A given order can be inverted by just exchanging its direction, pictorially flipping the Hasse diagram top-down. This yields the so-called
dual,
inverse, or
opposite order.Every order theoretic definition has its dual: it is the notion one obtains by applying the definition to the inverse order. Since the symmetry of all concepts, this operation preserves the theorems of partial orders. For a given mathematical result, one can just invert the order and replace all definitions by their duals and one obtains another valid theorem. This is important and useful, since one obtains two theorems for the price of one. Some more details and examples can be found in the article on
duality in order theory.
Constructing new orders
There are many ways to construct orders out of given orders. The dual order is one example. Another important construction is the
cartesian product of two partially ordered sets, taken together with the
product order on pairs of elements. The ordering is defined by (
a,
x) ≤ (
b,
y) if (and only if)
a ≤
b and
x ≤
y. (Notice carefully that there are three distinct meanings for the relation symbol ≤ in this definition.) The
disjoint union of two posets is another typical example of order construction, where the order is just the (disjoint) union of the original orders.Every partial order ≤ gives rise to a so-called
strict order <, by defining
a <
b if
a ≤
b and not
b ≤
a. This transformation can be inverted by setting
a ≤
b if
a <
b or
a =
b. The two concepts are equivalent although in some circumstances one can be more convenient to work with than the other.
Functions between orders
It is reasonable to consider functions between partially ordered sets having certain additional properties, that are related to the ordering relations of the two sets. The most fundamental condition that occurs in this context is
monotonicity. A function
f from a poset
P to a poset
Q is
monotone, or
order-preserving, if
a ≤
b in
P implies
f(
a) ≤
f(
b) in
Q (Noting that, strictly, the two relations here are different since they apply to different sets.). The converse of this implication leads to functions that are
order-reflecting, i.e. functions
f as above for which
f(
a) ≤
f(
b) implies
a ≤
b. On the other hand, a function may also be
order-reversing or
antitone, if
a ≤
b implies
f(
b) ≤
f(
a).An
order-embedding is a function
f between orders that is both order-preserving and order-reflecting. Examples for these definitions are found easily. For instance, the function that maps a natural number to its successor is clearly monotone with respect to the natural order. Any function from a discrete order, i.e. from a set ordered by the identity order "=", is also monotone. Mapping each natural number to the corresponding real number gives an example for an order embedding. The
set complement on a
powerset is an example of an antitone function.An important question is when two orders are "essentially equal", i.e. when they are the same up to renaming of elements.
Order isomorphisms are functions that define such a renaming. An order-isomorphism is a monotone
bijective function that has a monotone inverse. This is equivalent to being a
surjective order-embedding. Hence, the image
f(
P) of an order-embedding is always isomorphic to
P, which justifies the term "embedding".A more elaborate type of functions is given by so-called
Galois connections. Monotone Galois connections can be viewed as a generalization of order-isomorphisms, since they constitute of a pair of two functions in converse directions, which are "not quite" inverse to each other, but that still have close relationships.Another special type of self-maps on a poset are
closure operators, which are not only monotonic, but also
idempotent, i.e.
f(
x) =
f(
f(
x)), and
extensive (or
inflationary), i.e.
x ≤
f(
x). These have many applications in all kinds of "closures" that appear in mathematics.Besides being compatible with the mere order relations, functions between posets may also behave well with respect to special elements and constructions. For example, when talking about posets with least element, it may seem reasonable to consider only monotonic functions that preserve this element, i.e. which map least elements to least elements. If binary infima ^ exist, then a reasonable property might be to require that
f(
x^
y) =
f(
x)^
f(
y), for all
x and
y. All of these properties, and indeed many more, may be compiled under the label of
limit-preserving functions.Finally, one can invert the view, switching from
functions of orders to
orders of functions. Indeed, the functions between two posets
P and
Q can be ordered via the
pointwise order. For two functions
f and
g, we have
f ≤
g if
f(
x) ≤
g(
x) for all elements
x of
P. This occurs for example in
domain theory, where
function spaces play an important role.
Special types of orders
Many of the structures that are studied in order theory employ order relations with further properties. In fact, even some relations that are not partial orders are of special interest. Mainly the concept of a
preorder has to be mentioned. A preorder is a relation that is reflexive and transitive, but not necessarily antisymmetric. Each preorder induces an
equivalence relation between elements, where
a is equivalent to
b, if
a ≤
b and
b ≤
a. Preorders can be turned into orders by identifying all elements that are equivalent with respect to this relation.Basic types of special orders have already been given in form of total orders. An additional simple but useful property leads to so-called
well-orders, for which all non-empty subsets have a minimal element. Generalizing well-orders from linear to partial orders, a set is
well partially ordered if all its non-empty subsets have a finite number of minimal elements.Many other types of orders arise when the existence of
infima and
suprema of certain sets is guaranteed. Focusing on this aspect, usually referred to as
completeness of orders, one obtains:
However, one can go even further: if all finite non-empty infima exist, then ^ can be viewed as a total binary operation in the sense of
universal algebra. Hence, in a lattice, two operations ^ and v are available, and one can define new properties by giving identities, such as
x ^ (y v z) = (x ^ y) v (x ^ z), for all x, y, and z.
This condition is called
distributivity and gives rise to
distributive lattices. There are some other important distributivity laws which are discussed in the article on
distributivity in order theory. Some additional order structures that are often specified via algebraic operations and defining identities are
which both introduce a new operation ~ called
negation. Both structures play a role in
mathematical logic and especially Boolean algebras have major applications in
computer science.Finally, various structures in mathematics combine orders with even more algebraic operations, as in the case of
quantales, that allow for the definition of an addition operation.Many other important properties of posets exist. For example, a poset is
locally finite if every closed
interval [
a,
b] in it is
finite. Locally finite posets give rise to
incidence algebras which in turn can be used to define the Euler characteristic of finite bounded posets.
Subsets of ordered sets
In an ordered set, one can define many types of special subsets based on the given order. A simple example are
upper sets; i.e. sets that contain all elements that are above them in the order. Formally, the
upper closure of a set
S in a poset
P is given by the set {
x in
P | there is some
y in
S with
y ≤
x}. A set that is equal to its upper closure is called an upper set.
Lower sets are defined dually.More complicated lower subsets are
ideals, which have the additional property that each two of their elements have an upper bound within the ideal. Their duals are given by
filters. A related concept is that of a
directed subset, which like an ideal contains upper bounds of finite subsets, but does not have to be a lower set. Furthermore it is often generalized to preordered sets.A subset which is - as a sub-poset - linearly ordered, is called a
chain. The opposite notion, the
antichain, is a subset that contains no two comparable elements; i.e. that is a discrete order.
Related mathematical areas
Although most mathematical areas
use orders in one or the other way, there are also a few theories that have relationships which go far beyond mere application. Together with their major touching points with order theory, some of these are to be presented below.
Universal algebra
As already mentioned, the methods and formalisms of
universal algebra are an important tool for many order theoretic considerations. Beside formalizing orders in terms of algebraic structures that satisfy certain identities, one can also establish other connections to algebra. An example is given by the correspondence between
Boolean algebras and
Boolean rings. Other issues are concerned with the existence of free constructions, such as
free lattices based on a given set of generators. Furthermore, closure operators are important in the study of universal algebra.
Topology
In
topology orders play a very prominent role. In fact, the set of
open sets provides a classical example of a complete lattice, more precisely a complete
Heyting algebra (or "
frame" or "
locale").
Filters and
nets are notions closely related to order theory and the
closure operator of sets can be used to define topology. Beyond these relations, topology can be looked at solely in terms of the open set lattices, which leads to the study of
pointless topology. Furthermore, a natural preorder of elements of the underlying set of a topology is given by the so-called
specialization order, that is actually a partial order if the topology is
T0.Conversely, in order theory, one often makes use of topological results. There are various ways to define subsets of an order which can be considered as open sets of a topology. Especially, it is interesting to consider topologies on a poset (
X, ≤) that in turn induce ≤ as their specialization order. The
finest such topology is the
Alexandrov topology, given by taking all upper sets as opens. Conversely, the
coarsest topology that induces the specialization order is the
upper topology, having the complements of
principal ideals (i.e. sets of the form {
y in
X |
y ≤
x} for some
x) as a
subbase. Additionally, a topology with specialization order ≤ may be
order consistent, meaning that their open sets are "inaccessible by directed suprema" (with respect to ≤). The finest order consistent topology is the
Scott topology, which is coarser than the Alexandrov topology. A third important topology in this spirit is the
Lawson topology. There are close connections between these topologies and the concepts of order theory. For example, a function preserves directed suprema
iff it is
continuous with respect to the Scott topology (for this reason this order theoretic property is also called
Scott-continuity).
Category theory
The visualization of orders with Hasse diagrams has a straightforward generalization: instead of displaying lesser elements
below greater ones, the direction of the order can also be depicted by giving directions to the edges of a graph. In this way, each order is seen to be equivalent to a
directed acyclic graph, where the nodes are the elements of the poset and there is a directed path from
a to
b if and only if
a ≤
b. Dropping the requirement of being acyclic, one can also obtain all preorders.When equipped with all transitive edges, these graphs in turn are just special
categories, where elements are objects and each set of morphisms between two elements is at most singleton. Functions between orders become functors between categories. Interestingly, many ideas of order theory are just concepts of category theory in small. For example, an infimum is just a
categorical product. More generally, one can capture suprema and infima under the abstract notion of a
categorical limit (or
colimit, respectively). Another place where categorical ideas occur is the concept of a (monotone)
Galois connection, which is just the same as a pair of
adjoint functors.But category theory also has its impact on order theory on a larger scale. Classes of posets with appropriate functions as discussed above form interesting categories. Often one can also state constructions of orders, like the
product order, in terms of categories. Further insights result when categories of orders are found
categorically equivalent to other categories, for example of topological spaces. This line of research leads to various
representation theorems, often collected under the label of
Stone duality.
History
As explained before, orders are ubiquitous in mathematics. However, earliest explicit mentionings of partial orders are probably to be found not before the 19th century. In this context the works of
George Boole are of great importance. Moreover, works of
Charles S. Peirce,
Richard Dedekind, and
Ernst Schröder also consider concepts of order theory. Certainly, there are others to be named in this context and surely there exists more detailed material on the history of order theory. The term
poset as an abbreviation for partially ordered set was coined by
Garrett Birkhoff in the second edition of his influential book
Lattice Theory.
(1)(2)See also
Notes
-
[Birkhoff 1948, p.1]
-
[Earliest Known Uses of Some of the Words of Mathematics]
References
- BOOK, Garrett Birkhoff, Lattice Theory, volume 25, Amer. Math. Soc. Coll. Publ., New York, 1948,
- BOOK, S. N. Burris and H. P. Sankappanavar, 1981,weblink A Course in Universal Algebra, Springer Verlag,
A free online introduction to universal algebra, with much material on lattices.
- BOOK, B. A. Davey and H. A. Priestley, 2002, Introduction to Lattices and Order, 2nd ed., Cambridge University Press, 0-521-78451-4,
A good contemporary introduction to the subject. Suitable for undergraduates.
- G. Gierz, K. H. Hofmann, K. Keimel, J. D. Lawson, M. Mislove, and D. S. Scott (2003). "Continuous Lattices and Domains," in Encyclopedia of Mathematics and its Applications, Vol. 93, Cambridge University Press. ISBN 0-521-80338-1
The comprehensive new version of the famous "Compendium" of continuous lattices. Assumes some advanced mathematical background.
External links
{{Wiktionary|ordering}}
- Orders at ProvenMath partial order, linear order, well order, initial segment; formal definitions and proofs within the axioms of set theory.
نظرية الترتيبOrdnungsrelationTeoría del ordenJärjestusRelation d'ordreTeoria degli ordiniCzęściowy porządekSıralamalar序理论
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