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.

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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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Referenced by (3)

Full triples — surface form annotated when it differs from this entity's canonical label.

Plancherel theorem for real reductive groups generalizes Plancherel theorem for locally compact abelian groups
Fourier inversion theorem isRelatedTo Plancherel theorem for locally compact abelian groups
this entity surface form: Plancherel theorem
Riesz–Fischer theorem relatedTo Plancherel theorem for locally compact abelian groups
this entity surface form: Plancherel theorem