Difference between revisions of "Analytic Borel space"
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{{MSC|03E15|28A05,54H05}} | {{MSC|03E15|28A05,54H05}} | ||
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| − | $ | + | $\newcommand{\A}{\mathcal A} |
| − | + | \newcommand{\B}{\mathcal B}$ | |
| − | + | A [[measurable space|Borel space]] is called '''analytic''' if it is [[Measurable space#separated|countably separated]] and [[Measurable space#isomorphic|isomorphic]] to a [[Measurable space#quotient space|quotient space]] of a [[Standard Borel space|standard]] Borel space. | |
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| − | A [[measurable space|Borel space]] is called '''analytic''' if it is | ||
See below for an equivalent definition. | See below for an equivalent definition. | ||
Finite and countable analytic Borel spaces are trivial: all subsets are measurable. Uncountable | Finite and countable analytic Borel spaces are trivial: all subsets are measurable. Uncountable | ||
| − | analytic Borel spaces are of [[Continuum, cardinality of the|cardinality continuum]]. Some, but not all, of them are standard; these are mutually isomorphic. Some additional (to [[ZFC]]) set-theoretic axioms imply that all nonstandard analytic Borel spaces are mutually isomorphic (see | + | analytic Borel spaces are of [[Continuum, cardinality of the|cardinality continuum]]. Some, but not all, of them are standard; these are mutually isomorphic. Some additional (to [[ZFC]]) set-theoretic axioms imply that all nonstandard analytic Borel spaces are mutually isomorphic (see {{Cite|K|Sect. 26.D}}). |
| − | ''Non-example.'' The [[quotient group]] $\R/\Q$ (real numbers modulo rational numbers, additive) may be thought of as a quotient measurable space, $\R$ being endowed with its Borel σ-algebra. Then $\R/\Q$ is a quotient space of a standard Borel space, but not an analytic Borel space, because it is not countably separated. (See | + | ''Non-example.'' The [[quotient group]] $\R/\Q$ (real numbers modulo rational numbers, additive) may be thought of as a quotient measurable space, $\R$ being endowed with its Borel σ-algebra. Then $\R/\Q$ is a quotient space of a standard Borel space, but not an analytic Borel space, because it is not countably separated. (See {{Cite|M|Sect. 5}}.) |
====Relations to analytic sets==== | ====Relations to analytic sets==== | ||
| − | A subset of a standard Borel (or just countably separated measurable) space is called ''analytic'' if it is the image of a standard Borel space under a Borel map. (See | + | A subset of a standard Borel (or just countably separated measurable) space is called ''analytic'' if it is the image of a standard Borel space under a Borel map. (See {{Cite|K|Sect. 14.A}}.) |
As every subset of a measurable space, an analytic set is itself a measurable space (a | As every subset of a measurable space, an analytic set is itself a measurable space (a | ||
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Equivalence of the two definitions follows from the [[Standard Borel space#Blackwell-Mackey theorem|Blackwell-Mackey theorem]] and the following simple fact: every countably separated measurable space admits a one-to-one measurable map to a standard Borel space. | Equivalence of the two definitions follows from the [[Standard Borel space#Blackwell-Mackey theorem|Blackwell-Mackey theorem]] and the following simple fact: every countably separated measurable space admits a one-to-one measurable map to a standard Borel space. | ||
| − | See | + | See {{Cite|K|Sect. 25.A}}, {{Cite|M|Sect. 4}} for these, and some other, definitions of analytic sets and spaces. |
====Measurable injections==== | ====Measurable injections==== | ||
| − | Several [[Standard Borel space#Measurable injections|results on standard Borel spaces]] generalize to analytic Borel spaces (see | + | Several [[Standard Borel space#Measurable injections|results on standard Borel spaces]] generalize to analytic Borel spaces (see {{Cite|M|Sect. 4}}, {{Cite|S|Sect. 4.5}}). |
'''Theorem 1a.''' If a bijective map between analytic Borel spaces is measurable then the inverse map is also measurable. | '''Theorem 1a.''' If a bijective map between analytic Borel spaces is measurable then the inverse map is also measurable. | ||
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The Blackwell-Mackey theorem generalizes readily from standard to analytic spaces, since a quotient space of an analytic space evidently is also a quotient space of a standard space. | The Blackwell-Mackey theorem generalizes readily from standard to analytic spaces, since a quotient space of an analytic space evidently is also a quotient space of a standard space. | ||
| + | |||
| + | Every analytic Borel space is [[universally measurable]]. | ||
====References==== | ====References==== | ||
{| | {| | ||
| − | |valign="top"| | + | |valign="top"|{{Ref|K}}|| Alexander S. Kechris, "Classical descriptive set theory", Springer-Verlag (1995). {{MR|1321597}} {{ZBL|0819.04002}} |
|- | |- | ||
| − | |valign="top"| | + | |valign="top"|{{Ref|M}}|| George W. Mackey, "Borel structure in groups and their duals", ''Trans. Amer. Math. Soc.'' '''85''' (1957), 134–165. {{MR|0089999}} {{ZBL|0082.11201}} |
|- | |- | ||
| − | |valign="top"| | + | |valign="top"|{{Ref|S}}|| S.M. Srivastava, "A course on Borel sets", Springer-Verlag (1998). {{MR|1619545}} {{ZBL|0903.28001}} |
|} | |} | ||
Latest revision as of 20:31, 18 February 2012
Also: analytic measurable space
2020 Mathematics Subject Classification: Primary: 03E15 Secondary: 28A0554H05 [MSN][ZBL]
$\newcommand{\A}{\mathcal A} \newcommand{\B}{\mathcal B}$ A Borel space is called analytic if it is countably separated and isomorphic to a quotient space of a standard Borel space.
See below for an equivalent definition.
Finite and countable analytic Borel spaces are trivial: all subsets are measurable. Uncountable analytic Borel spaces are of cardinality continuum. Some, but not all, of them are standard; these are mutually isomorphic. Some additional (to ZFC) set-theoretic axioms imply that all nonstandard analytic Borel spaces are mutually isomorphic (see [K, Sect. 26.D]).
Non-example. The quotient group $\R/\Q$ (real numbers modulo rational numbers, additive) may be thought of as a quotient measurable space, $\R$ being endowed with its Borel σ-algebra. Then $\R/\Q$ is a quotient space of a standard Borel space, but not an analytic Borel space, because it is not countably separated. (See [M, Sect. 5].)
Relations to analytic sets
A subset of a standard Borel (or just countably separated measurable) space is called analytic if it is the image of a standard Borel space under a Borel map. (See [K, Sect. 14.A].)
As every subset of a measurable space, an analytic set is itself a measurable space (a subspace of the given space).
Definition 2 (equivalent). A Borel space is called analytic if it is isomorphic to an analytic set.
Equivalence of the two definitions follows from the Blackwell-Mackey theorem and the following simple fact: every countably separated measurable space admits a one-to-one measurable map to a standard Borel space.
See [K, Sect. 25.A], [M, Sect. 4] for these, and some other, definitions of analytic sets and spaces.
Measurable injections
Several results on standard Borel spaces generalize to analytic Borel spaces (see [M, Sect. 4], [S, Sect. 4.5]).
Theorem 1a. If a bijective map between analytic Borel spaces is measurable then the inverse map is also measurable.
Theorem 1b. If σ-algebras $\A$, $\B$ on $X$ are such that $\A\subset\B$ and $(X,\A)$, $(X,\B)$ are analytic then $\A=\B$.
Example. The real line with the Lebesgue σ-algebra is not analytic (by Theorem 1b).
Theorem 2a. If a bijective map from an analytic Borel space to a countably separated measurable space is measurable then the inverse map is also measurable.
Theorem 2b. If σ-algebras $\A$, $\B$ on $X$ are such that $\A\subset\B$, $(X,\A)$ is countably separated and $(X,\B)$ is analytic then $\A=\B$.
Theorem 2c. If $(X,\A)$ is an analytic Borel space then $\A$ is generated by every at most countable separating subset of $\A$.
The Blackwell-Mackey theorem generalizes readily from standard to analytic spaces, since a quotient space of an analytic space evidently is also a quotient space of a standard space.
Every analytic Borel space is universally measurable.
References
| [K] | Alexander S. Kechris, "Classical descriptive set theory", Springer-Verlag (1995). MR1321597 Zbl 0819.04002 |
| [M] | George W. Mackey, "Borel structure in groups and their duals", Trans. Amer. Math. Soc. 85 (1957), 134–165. MR0089999 Zbl 0082.11201 |
| [S] | S.M. Srivastava, "A course on Borel sets", Springer-Verlag (1998). MR1619545 Zbl 0903.28001 |
Analytic Borel space. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Analytic_Borel_space&oldid=20707