| 1. | The complexes of a measurable space are called "'measurable sets " '.
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| 2. | However, the definition above is valid for any measurable space E of values.
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| 3. | Every subset of a measurable space is itself a measurable space.
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| 4. | Every subset of a measurable space is itself a measurable space.
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| 5. | A measure space is a measurable space endowed with a measure.
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| 6. | Standard measurable spaces ( called also standard Borel spaces ) are especially useful.
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| 7. | Every probability measure on a standard measurable space leads to a standard probability space.
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| 8. | Commutative self-adjoint operator algebras can be regarded as the algebra of standard measurable space.
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| 9. | Measurable sets, given in a measurable space by definition, lead to measurable functions and maps.
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| 10. | All uncountable standard measurable spaces are mutually isomorphic.
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