Cone-saturated explained

In mathematics, specifically in order theory and functional analysis, if

is a cone at 0 in a vector space

such that

0\inC,

then a subset

S\subseteqX

is said to be C

-saturated if

S=[S]_C,

where

[S]_C:=(S+C)\cap(S-C).

Given a subset

S\subseteqX,

the C

-saturated hull of

is the smallest

-saturated subset of

that contains

l{F}

is a collection of subsets of

then

\left[l{F}\right]_C:=\left\{[F]_C:F\inl{F}\right\}.

l{T}

is a collection of subsets of

and if

l{F}

is a subset of

l{T}

then

l{F}

is a fundamental subfamily of

l{T}

if every

T\inl{T}

is contained as a subset of some element of

l{F}.

l{G}

is a family of subsets of a TVS

then a cone

is called a l{G}

-cone if

\left\{\overline{[G]_C}:G\inl{G}\right\}

is a fundamental subfamily of

l{G}

and

is a strict
l{G}

-cone if

\left\{[B]_C:B\inl{B}\right\}

is a fundamental subfamily of

l{B}.

-saturated sets play an important role in the theory of ordered topological vector spaces and topological vector lattices.

Properties

is an ordered vector space with positive cone

then

[S]_C=cup\left\{[x,y]:x,y\inS\right\}.

The map

S\mapsto[S]_C

is increasing; that is, if

R\subseteqS

then

[R]_C\subseteq[S]_C.

is convex then so is

[S]_C.

When

is considered as a vector field over

\R,

then if

is balanced then so is

[S]_C.

l{F}

is a filter base (resp. a filter) in

then the same is true of

\left[l{F}\right]_C:=\left\{[F]_C:F\inl{F}\right\}.