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Difference between revisions of "Quasi-invariant measure"

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A measure on a space that is equivalent to itself under  "translations"  of this space. More precisely: Let  $  ( X , B ) $
 
A measure on a space that is equivalent to itself under  "translations"  of this space. More precisely: Let  $  ( X , B ) $
 
be a [[Measurable space|measurable space]] (that is, a set  $  X $
 
be a [[Measurable space|measurable space]] (that is, a set  $  X $
with a distinguished  $  \sigma $-
+
with a distinguished  $  \sigma $-algebra  $  B $
algebra  $  B $
 
 
of subsets of it) and let  $  G $
 
of subsets of it) and let  $  G $
 
be a group of automorphisms of it (that is, one-to-one transformations  $  g :  X \rightarrow X $
 
be a group of automorphisms of it (that is, one-to-one transformations  $  g :  X \rightarrow X $
that are measurable together with their inverses  $  g  ^ {-} 1 $
+
that are measurable together with their inverses  $  g  ^ {-1} $
with respect to the  $  \sigma $-
+
with respect to the  $  \sigma $-algebra  $  B $).  
algebra  $  B $).  
 
 
A measure  $  \mu $
 
A measure  $  \mu $
 
on  $  ( X , B ) $
 
on  $  ( X , B ) $
 
is said to be quasi-invariant (with respect to  $  G $)  
 
is said to be quasi-invariant (with respect to  $  G $)  
 
if for any  $  g \in G $
 
if for any  $  g \in G $
the transformed measure  $  g \mu ( A) = \mu ( g  ^ {-} 1 A ) $,  
+
the transformed measure  $  g \mu ( A) = \mu ( g  ^ {-1} A ) $,  
 
$  A \in B $,  
 
$  A \in B $,  
is equivalent to the measure  $  \mu $(
+
is equivalent to the measure  $  \mu $
that is, these measures are absolutely continuous with respect to each other, cf. [[Absolute continuity|Absolute continuity]]). If  $  X $
+
(that is, these measures are absolutely continuous with respect to each other, cf. [[Absolute continuity|Absolute continuity]]). If  $  X $
is a topological [[Homogeneous space|homogeneous space]] with a continuous locally compact group of automorphisms  $  G $(
+
is a topological [[Homogeneous space|homogeneous space]] with a continuous locally compact group of automorphisms  $  G $
that is,  $  G $
+
(that is,  $  G $
 
acts transitively on  $  X $
 
acts transitively on  $  X $
 
and is endowed with a topology such that the mapping  $  G \times X \rightarrow X $,  
 
and is endowed with a topology such that the mapping  $  G \times X \rightarrow X $,  
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is continuous with respect to the product topology on  $  G \times X $)  
 
is continuous with respect to the product topology on  $  G \times X $)  
 
and  $  B $
 
and  $  B $
is the Borel  $  \sigma $-
+
is the Borel  $  \sigma $-algebra with respect to the topology on  $  X $,  
algebra with respect to the topology on  $  X $,  
+
then there exists a quasi-invariant measure that is unique up to equivalence [[#References|[1]]]. In particular, a measure on  $\mathbf R  ^ {n} $
then there exists a quasi-invariant measure that is unique up to equivalence [[#References|[1]]]. In particular, a measure on  $ \mathbf R  ^ {n} $
 
 
is quasi-invariant with respect to all shifts  $  x \rightarrow x + a $,  
 
is quasi-invariant with respect to all shifts  $  x \rightarrow x + a $,  
 
$  x , a \in \mathbf R  ^ {n} $,  
 
$  x , a \in \mathbf R  ^ {n} $,  
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There exists no quasi-invariant measure on an infinite-dimensional Hilbert space with respect to the group of all translations (and so, in particular, no Haar measure). Let  $  \Phi \subset  H \subset  \Phi  ^  \prime  $
 
There exists no quasi-invariant measure on an infinite-dimensional Hilbert space with respect to the group of all translations (and so, in particular, no Haar measure). Let  $  \Phi \subset  H \subset  \Phi  ^  \prime  $
be a rigged Hilbert space, with  $  \Phi $
+
be a [[rigged Hilbert space]], with  $  \Phi $
a nuclear space with inner product  $  (  , ) $,  
+
a [[nuclear space]] with inner product  $  (  , ) $,  
 
$  H $
 
$  H $
 
the completion of  $  \Phi $,  
 
the completion of  $  \Phi $,  

Latest revision as of 17:20, 11 March 2021


A measure on a space that is equivalent to itself under "translations" of this space. More precisely: Let $ ( X , B ) $ be a measurable space (that is, a set $ X $ with a distinguished $ \sigma $-algebra $ B $ of subsets of it) and let $ G $ be a group of automorphisms of it (that is, one-to-one transformations $ g : X \rightarrow X $ that are measurable together with their inverses $ g ^ {-1} $ with respect to the $ \sigma $-algebra $ B $). A measure $ \mu $ on $ ( X , B ) $ is said to be quasi-invariant (with respect to $ G $) if for any $ g \in G $ the transformed measure $ g \mu ( A) = \mu ( g ^ {-1} A ) $, $ A \in B $, is equivalent to the measure $ \mu $ (that is, these measures are absolutely continuous with respect to each other, cf. Absolute continuity). If $ X $ is a topological homogeneous space with a continuous locally compact group of automorphisms $ G $ (that is, $ G $ acts transitively on $ X $ and is endowed with a topology such that the mapping $ G \times X \rightarrow X $, $ ( g , x ) \rightarrow g x $, is continuous with respect to the product topology on $ G \times X $) and $ B $ is the Borel $ \sigma $-algebra with respect to the topology on $ X $, then there exists a quasi-invariant measure that is unique up to equivalence [1]. In particular, a measure on $\mathbf R ^ {n} $ is quasi-invariant with respect to all shifts $ x \rightarrow x + a $, $ x , a \in \mathbf R ^ {n} $, if and only if it is equivalent to Lebesgue measure. If the group of transformations is not locally compact, there need not be a quasi-invariant measure; this is the case, for example, in a wide class of infinite-dimensional topological vector spaces [2].

References

[1] N. Bourbaki, "Elements of mathematics. Integration" , Addison-Wesley (1975) pp. Chapt.6;7;8 (Translated from French)
[2] I.M. Gel'fand, N.Ya. Vilenkin, "Generalized functions. Applications of harmonic analysis" , 4 , Acad. Press (1964) (Translated from Russian)

Comments

Thus, a quasi-invariant measure is a generalization of a Haar measure on a topological group. On a locally compact group with left Haar measure $ \mu $ a measure is left quasi-invariant (quasi-invariant under left translations) if and only if it is equivalent to $ \mu $.

There exists no quasi-invariant measure on an infinite-dimensional Hilbert space with respect to the group of all translations (and so, in particular, no Haar measure). Let $ \Phi \subset H \subset \Phi ^ \prime $ be a rigged Hilbert space, with $ \Phi $ a nuclear space with inner product $ ( , ) $, $ H $ the completion of $ \Phi $, and $ \Phi ^ \prime $ the dual of $ \Phi $. Each $ f \in \Phi $ defines an element $ F _ {f} $ in $ \Phi ^ \prime $, the functional $ F _ {f} ( g) = \langle f , g\rangle $. A measure $ \mu $ on $ \Phi ^ \prime $ is quasi-invariant if $ \mu ( F _ {f} + X) = 0 $ for all $ f \in \Phi $ and $ X \subset \Phi ^ \prime $ with $ \mu ( X) = 0 $, i.e. if it is quasi-invariant with respect to the group of translations $ \{ {F _ {f} } : {f \in \Phi } \} $. There exist quasi-invariant measures on such dual spaces of nuclear spaces, [2], Chapt. IV, §5.2.

How to Cite This Entry:
Quasi-invariant measure. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Quasi-invariant_measure&oldid=48385
This article was adapted from an original article by R.A. Minlos (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article