Measurable space mathematics , a measurable space Borel space basic object in measure theory . It consists of a set and a σ-algebra , which defines the subsets that will be measured .Definition Consider a set and a σ-algebra on. Then the tuple is called a measurable space.Note that in contrast to a measure space , no measure is needed for a measurable space.Example Look at the setpower set on :Common measurable spaces If is finite or countable infinite , the -algebra is most of the times the power set on, so. This leads to the measurable space.topological space , the -algebra is most commonly the Borel -algebra , so. This leads to the measurable space that is common for all topological spaces such as the real numbers .The term Borel space is used for different types of measurable spaces. It can refer to any measurable space, so it is a synonym for a measurable space as defined above a measurable space that is Borel isomorphic to a measurable subset of the real numbers
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