Sub-probability measure

In the mathematical theory of probability and measure, a sub-probability measure is a measure that is closely related to probability measures. While probability measures always assign the value 1 to the underlying set, sub-probability measures assign a value lesser than or equal to 1 to the underlying set.

Let ${\displaystyle \mu }$ be a measure on the measurable space ${\displaystyle (X,𝒜)}$.

Then ${\displaystyle \mu }$ is called a sub-probability measure if ${\displaystyle \mu (X)\le 1}$.^[1][2]

In measure theory, the following implications hold between measures: $${\displaystyle \text{probability}⟹\text{sub-probability}⟹\text{finite}⟹\sigma \text{-finite}}$$

So every probability measure is a sub-probability measure, but the converse is not true. Also every sub-probability measure is a finite measure and a σ-finite measure, but the converse is again not true.

• Helly's selection theorem
• Helly–Bray theorem

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