Cofinal (mathematics) explained

B\subseteqA

of a preordered set

(A,\leq)

is said to be cofinal or frequent in

if for every

a\inA,

it is possible to find an element

that is "larger than

" (explicitly, "larger than

" means

a\leqb

Cofinal subsets are very important in the theory of directed sets and nets, where “cofinal subnet” is the appropriate generalization of "subsequence". They are also important in order theory, including the theory of cardinal numbers, where the minimum possible cardinality of a cofinal subset of

is referred to as the cofinality of

Definitions

Let

\leq

be a homogeneous binary relation on a set

A subset

B\subseteqA

is said to be or with respect to

\leq

if it satisfies the following condition:

For every

a\inA,

there exists some

b\inB

that

a\leqb.

A subset that is not frequent is called . This definition is most commonly applied when

(A,\leq)

is a directed set, which is a preordered set with additional properties.

Final functions

f:X\toA

between two directed sets is said to be ^[1] if the image

f(X)

is a cofinal subset of

Coinitial subsets

A subset

B\subseteqA

is said to be (or in the sense of forcing) if it satisfies the following condition:

For every

a\inA,

there exists some

b\inB

such that

b\leqa.

This is the order-theoretic dual to the notion of cofinal subset. Cofinal (respectively coinitial) subsets are precisely the dense sets with respect to the right (respectively left) order topology.

Properties

The cofinal relation over partially ordered sets ("posets") is reflexive: every poset is cofinal in itself. It is also transitive: if

is a cofinal subset of a poset

and

is a cofinal subset of

(with the partial ordering of

applied to

), then

is also a cofinal subset of

For a partially ordered set with maximal elements, every cofinal subset must contain all maximal elements, otherwise a maximal element that is not in the subset would fail to be any element of the subset, violating the definition of cofinal. For a partially ordered set with a greatest element, a subset is cofinal if and only if it contains that greatest element (this follows, since a greatest element is necessarily a maximal element). Partially ordered sets without greatest element or maximal elements admit disjoint cofinal subsets. For example, the even and odd natural numbers form disjoint cofinal subsets of the set of all natural numbers.

If a partially ordered set

admits a totally ordered cofinal subset, then we can find a subset

that is well-ordered and cofinal in

(A,\leq)

is a directed set and if

B\subseteqA

is a cofinal subset of

then

(B,\leq)

is also a directed set.

Examples and sufficient conditions

Any superset of a cofinal subset is itself cofinal.

(A,\leq)

is a directed set and if some union of (one or more) finitely many subsets

S₁\cup … \cupS_n

is cofinal then at least one of the set

S_1,\ldots,S_n

is cofinal. This property is not true in general without the hypothesis that

(A,\leq)

is directed.

Subset relations and neighborhood bases

Let

be a topological space and let

l{N}_x

denote the neighborhood filter at a point

x\inX.

The superset relation

\supseteq

is a partial order on

l{N}_x

: explicitly, for any sets

and

declare that

S\leqT

if and only if

S\supseteqT

(so in essence,

\leq

is equal to

\supseteq

). A subset

l{B}\subseteql{N}_x

is called a at

if (and only if)

l{B}

is a cofinal subset of

\left(l{N}_x,\supseteq\right);

that is, if and only if for every

N\inl{N}_x

there exists some

B\inl{B}

such that

N\supseteqB.

(I.e. such that

N\leqB

Cofinal subsets of the real numbers

For any

-infty<x<infty,

the interval

(x,infty)

is a cofinal subset of

(\R,\leq)

but it is a cofinal subset of

(\R,\geq).

The set

of natural numbers (consisting of positive integers) is a cofinal subset of

(\R,\leq)

but this is true of the set of negative integers

-\N:=\{-1,-2,-3,\ldots\}.

Similarly, for any

-infty<y<infty,

the interval

(-infty,y)

is a cofinal subset of

(\R,\geq)

but it is a cofinal subset of

(\R,\leq).

The set

-\N

of negative integers is a cofinal subset of

(\R,\geq)

but this is true of the natural numbers

\N.

The set

of all integers is a cofinal subset of

(\R,\leq)

and also a cofinal subset of

(\R,\geq)

; the same is true of the set

\Q.

Cofinal set of subsets

A particular but important case is given if

is a subset of the power set

\wp(E)

of some set

ordered by reverse inclusion

\supseteq.

Given this ordering of

a subset

B\subseteqA

is cofinal in

if for every

a\inA

there is a

b\inB

such that

a\supseteqb.

For example, let

be a group and let

be the set of normal subgroups of finite index. The profinite completion of

is defined to be the inverse limit of the inverse system of finite quotients of

(which are parametrized by the set

). In this situation, every cofinal subset of

is sufficient to construct and describe the profinite completion of

Notes and References

Book: Bredon, Glen. Glen Bredon. Topology and Geometry. 1993. Springer. 16.

Cofinal (mathematics) explained

Definitions

Properties

Examples and sufficient conditions

Cofinal set of subsets

See also

Notes and References