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Template:Families of sets/doc

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Template's default state when transcluded is collapsed. To override, invoke as {{Families of sets|expanded}}.

To change the template's position from the default shown, add the parameter position with the value "left", "center", "centre" or "right".

Example call

[edit]

Calling

{{Families of sets}}

will display:

Call with alignment

[edit]

Calling

{{Families of sets|position=left}}

will display:

Expanded with alignment

[edit]

Calling

{{Families of sets|expanded|position=left}}

will display:

Families of sets over
Is necessarily true of
or, is closed under:
Directed
by
F.I.P.
π-system Yes Yes No No No No No No No No
Semiring Yes Yes No No No No No No Yes Never
Semialgebra (Semifield) Yes Yes No No No No No No Yes Never
Monotone class No No No No No only if only if No No No
𝜆-system (Dynkin System) Yes No No only if
Yes No only if or
they are disjoint
Yes Yes Never
Ring (Order theory) Yes Yes Yes No No No No No No No
Ring (Measure theory) Yes Yes Yes Yes No No No No Yes Never
δ-Ring Yes Yes Yes Yes No Yes No No Yes Never
𝜎-Ring Yes Yes Yes Yes No Yes Yes No Yes Never
Algebra (Field) Yes Yes Yes Yes Yes No No Yes Yes Never
𝜎-Algebra (𝜎-Field) Yes Yes Yes Yes Yes Yes Yes Yes Yes Never
Dual ideal Yes Yes Yes No No No Yes Yes No No
Filter Yes Yes Yes Never Never No Yes Yes Yes
Prefilter (Filter base) Yes No No Never Never No No No Yes
Filter subbase No No No Never Never No No No Yes
Open Topology Yes Yes Yes No No No
(even arbitrary )
Yes Yes Never
Closed Topology Yes Yes Yes No No
(even arbitrary )
No Yes Yes Never
Is necessarily true of
or, is closed under:
directed
downward
finite
intersections
finite
unions
relative
complements
complements
in
countable
intersections
countable
unions
contains contains Finite
Intersection
Property

Additionally, a semiring is a π-system where every complement is equal to a finite disjoint union of sets in
A semialgebra is a semiring where every complement is equal to a finite disjoint union of sets in
are arbitrary elements of and it is assumed that