Plancherel theorem for locally compact abelian groups
E876155
The Plancherel theorem for locally compact abelian groups is a fundamental result in harmonic analysis that identifies the Fourier transform as a unitary isomorphism between an L²-space on the group and an L²-space on its dual group, preserving inner products and norms.
All labels observed (2)
| Label | Occurrences |
|---|---|
| Plancherel theorem | 2 |
| Plancherel theorem for locally compact abelian groups canonical | 1 |
How this entity was disambiguated
This entity first appeared as the object of triple T10641466 — resolving that mention is where its identity was fixed. The disambiguator weighed these candidate entities and picked the highlighted one (or “None”, minting a new entity). This is how homonymy is resolved: the same surface form can point to different entities.
Target entity: Plancherel theorem for locally compact abelian groups Context triple: [Plancherel theorem for real reductive groups, generalizes, Plancherel theorem for locally compact abelian groups]
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A.
Plancherel theorem for real reductive groups
The Plancherel theorem for real reductive groups is a fundamental result in representation theory that describes how square-integrable functions on a real reductive Lie group decompose into irreducible unitary representations, generalizing Fourier analysis to this non-abelian setting.
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B.
Introduction to Abstract Harmonic Analysis
Introduction to Abstract Harmonic Analysis is a foundational graduate-level textbook that systematically develops the theory of harmonic analysis on topological groups and related abstract structures.
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C.
Pontryagin duality
Pontryagin duality is a fundamental theorem in harmonic analysis and topological group theory that establishes a duality between locally compact abelian groups and their groups of continuous characters.
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D.
Bochner theorem on characteristic functions
The Bochner theorem on characteristic functions is a fundamental result in probability theory and harmonic analysis that characterizes which functions are Fourier transforms of probability measures by requiring them to be positive-definite, continuous, and normalized at zero.
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E.
Harmonic Analysis and the Theory of Probability
Harmonic Analysis and the Theory of Probability is a seminal mathematical monograph that connects Fourier-analytic methods with probabilistic concepts, helping to lay the foundations of modern probability theory.
- F. None of above. chosen
- G. Unsure - the case is ambiguous/there is not enough information to decide.
Target entity: Plancherel theorem for locally compact abelian groups Target entity description: The Plancherel theorem for locally compact abelian groups is a fundamental result in harmonic analysis that identifies the Fourier transform as a unitary isomorphism between an L²-space on the group and an L²-space on its dual group, preserving inner products and norms.
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A.
Plancherel theorem for real reductive groups
The Plancherel theorem for real reductive groups is a fundamental result in representation theory that describes how square-integrable functions on a real reductive Lie group decompose into irreducible unitary representations, generalizing Fourier analysis to this non-abelian setting.
-
B.
Introduction to Abstract Harmonic Analysis
Introduction to Abstract Harmonic Analysis is a foundational graduate-level textbook that systematically develops the theory of harmonic analysis on topological groups and related abstract structures.
-
C.
Pontryagin duality
Pontryagin duality is a fundamental theorem in harmonic analysis and topological group theory that establishes a duality between locally compact abelian groups and their groups of continuous characters.
-
D.
Bochner theorem on characteristic functions
The Bochner theorem on characteristic functions is a fundamental result in probability theory and harmonic analysis that characterizes which functions are Fourier transforms of probability measures by requiring them to be positive-definite, continuous, and normalized at zero.
-
E.
Harmonic Analysis and the Theory of Probability
Harmonic Analysis and the Theory of Probability is a seminal mathematical monograph that connects Fourier-analytic methods with probabilistic concepts, helping to lay the foundations of modern probability theory.
- F. None of above. chosen
Statements (45)
| Predicate | Object |
|---|---|
| instanceOf | theorem in harmonic analysis ⓘ |
| appliesTo |
L2-spaces
ⓘ
locally compact abelian groups ⓘ |
| assumes |
Fourier transform initially defined on L1(G) ∩ L2(G)
NERFINISHED
ⓘ
G is a locally compact abelian group ⓘ |
| category | result about unitary representations ⓘ |
| codomainSpace | L2(Ĝ) ⓘ |
| conclusion | Fourier transform extends uniquely to all of L2(G) NERFINISHED ⓘ |
| domainSpace | L2(G) ⓘ |
| ensures | Parseval identity for L2-functions on G ⓘ |
| field |
abstract harmonic analysis
ⓘ
functional analysis ⓘ harmonic analysis ⓘ |
| generalizes |
Plancherel theorem for finite abelian groups
ⓘ
Plancherel theorem for the circle group NERFINISHED ⓘ Plancherel theorem for the real line NERFINISHED ⓘ |
| holdsFor | second countable locally compact abelian groups ⓘ |
| implies |
Fourier transform is defined almost everywhere for L2-functions
NERFINISHED
ⓘ
equality of L2-norms of a function and its Fourier transform ⓘ |
| importance | fundamental result in abstract harmonic analysis ⓘ |
| involvesConcept |
Fourier transform
NERFINISHED
ⓘ
Haar measure NERFINISHED ⓘ L2-norm ⓘ Pontryagin duality NERFINISHED ⓘ dual group ⓘ inner product ⓘ isometry ⓘ unitary isomorphism ⓘ unitary operator ⓘ |
| mathematicalArea | analysis on topological groups ⓘ |
| property |
Fourier transform is an isometry on L2(G)
NERFINISHED
ⓘ
Fourier transform is surjective from L2(G) onto L2(Ĝ) ⓘ preserves L2-norms ⓘ preserves inner products ⓘ |
| relatedTo |
Fourier inversion theorem
NERFINISHED
ⓘ
Parseval identity NERFINISHED ⓘ Pontryagin duality theorem NERFINISHED ⓘ |
| relates | L2(G) with L2(Ĝ) ⓘ |
| requires |
choice of Haar measure on G
ⓘ
corresponding Haar measure on the dual group Ĝ ⓘ |
| statement | the Fourier transform extends to a unitary operator from L2(G) onto L2(Ĝ) ⓘ |
| typicalNotation | ℱ: L2(G) → L2(Ĝ) ⓘ |
| usedIn |
Fourier analysis on groups
ⓘ
representation theory of abelian groups ⓘ signal processing on LCA groups ⓘ |
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Subject: Plancherel theorem for locally compact abelian groups Description of subject: The Plancherel theorem for locally compact abelian groups is a fundamental result in harmonic analysis that identifies the Fourier transform as a unitary isomorphism between an L²-space on the group and an L²-space on its dual group, preserving inner products and norms.
Referenced by (3)
Full triples — surface form annotated when it differs from this entity's canonical label.