K-finite (original) (raw)
In mathematics, a K-finite function is a type of generalized trigonometric polynomial. Here K is some compact group, and the generalization is from the circle group T. From an abstract point of view, the characterization of trigonometric polynomials amongst other functions F, in the harmonic analysis of the circle, is that for functions F in any of the typical function spaces, F is a trigonometric polynomial if and only if its Fourier coefficients an vanish for |n| large enough, and that this in turn is equivalent to the statement that all the translates F(t + θ) ρ(k).v
| Property | Value |
|---|---|
| dbo:abstract | In mathematics, a K-finite function is a type of generalized trigonometric polynomial. Here K is some compact group, and the generalization is from the circle group T. From an abstract point of view, the characterization of trigonometric polynomials amongst other functions F, in the harmonic analysis of the circle, is that for functions F in any of the typical function spaces, F is a trigonometric polynomial if and only if its Fourier coefficients an vanish for |n |
| dbo:wikiPageID | 11054062 (xsd:integer) |
| dbo:wikiPageLength | 1597 (xsd:nonNegativeInteger) |
| dbo:wikiPageRevisionID | 1122507271 (xsd:integer) |
| dbo:wikiPageWikiLink | dbr:Invariant_subspace dbr:Mathematics dbr:Compact_group dbr:Function_space dbr:Harmonic_analysis dbr:Fourier_coefficient dbc:Representation_theory_of_groups dbr:Circle_group dbr:Trigonometric_polynomial dbr:Complete_reducibility |
| dbp:wikiPageUsesTemplate | dbt:One_source dbt:Ref_improve |
| dct:subject | dbc:Representation_theory_of_groups |
| gold:hypernym | dbr:Polynomial |
| rdfs:comment | In mathematics, a K-finite function is a type of generalized trigonometric polynomial. Here K is some compact group, and the generalization is from the circle group T. From an abstract point of view, the characterization of trigonometric polynomials amongst other functions F, in the harmonic analysis of the circle, is that for functions F in any of the typical function spaces, F is a trigonometric polynomial if and only if its Fourier coefficients an vanish for |n |
| rdfs:label | K-finite (en) |
| owl:sameAs | freebase:K-finite wikidata:K-finite https://global.dbpedia.org/id/4pAmo |
| prov:wasDerivedFrom | wikipedia-en:K-finite?oldid=1122507271&ns=0 |
| foaf:isPrimaryTopicOf | wikipedia-en:K-finite |
| is dbo:wikiPageRedirects of | dbr:K-finite_vector dbr:K-finite_vector_function |
| is dbo:wikiPageWikiLink of | dbr:Zuckerman_functor dbr:Harish-Chandra_module dbr:Tempered_representation dbr:K-finite_vector dbr:K-finite_vector_function |
| is foaf:primaryTopic of | wikipedia-en:K-finite |