Delta-ring

Template:Short description Script error: No such module "For". In mathematics, a non-empty collection of sets $ℛ$ is called a $δ$ -ring (pronounced "Template:Em") if it is closed under union, relative complementation, and countable intersection. The name "delta-ring" originates from the German word for intersection, "Durchschnitt", which is meant to highlight the ring's closure under countable intersection, in contrast to a [[Sigma-ring|Template:Sigma-ring]] which is closed under countable unions.

Definition

A family of sets $ℛ$ is called a $δ$ -ring if it has all of the following properties:

Closed under finite unions: $A \cup B \in ℛ$ for all $A, B \in ℛ,$
Closed under relative complementation: $A - B \in ℛ$ for all $A, B \in ℛ,$ and
Closed under countable intersections: $⋂_{n = 1}^{\infty} A_{n} \in ℛ$ if $A_{n} \in ℛ$ for all $n \in ℕ .$

If only the first two properties are satisfied, then $ℛ$ is a ring of sets but not a $δ$ -ring. Every [[Sigma-ring|Template:Sigma-ring]] is a $δ$ -ring, but not every $δ$ -ring is a [[Sigma-ring|Template:Sigma-ring]].

$δ$ -rings can be used instead of σ-algebras in the development of measure theory if one does not wish to allow sets of infinite measure.

Examples

The family $𝒦 = {S \subseteq ℝ : S is bounded}$ is a $δ$ -ring but not a [[Sigma-ring|Template:Sigma-ring]] because $⋃_{n = 1}^{\infty} [0, n]$ is not bounded.

References

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Script error: No such module "Check for unknown parameters".

Cortzen, Allan. "Delta-Ring." From MathWorld—A Wolfram Web Resource, created by Eric W. Weisstein. http://mathworld.wolfram.com/Delta-Ring.html

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Delta-ring

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Delta-ring

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