Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q1529941> ?p ?o }
Showing triples 1 to 55 of
55
with 100 triples per page.
- Q1529941 subject Q10130151.
- Q1529941 subject Q8851983.
- Q1529941 subject Q8851992.
- Q1529941 subject Q8867041.
- Q1529941 subject Q8911731.
- Q1529941 abstract "In mathematics, the Peter–Weyl theorem is a basic result in the theory of harmonic analysis, applying to topological groups that are compact, but are not necessarily abelian. It was initially proved by Hermann Weyl, with his student Fritz Peter, in the setting of a compact topological group G (Peter & Weyl 1927). The theorem is a collection of results generalizing the significant facts about the decomposition of the regular representation of any finite group, as discovered by F. G. Frobenius and Issai Schur.The theorem has three parts. The first part states that the matrix coefficients of irreducible representations of G are dense in the space C(G) of continuous complex-valued functions on G, and thus also in the space L2(G) of square-integrable functions. The second part asserts the complete reducibility of unitary representations of G. The third part then asserts that the regular representation of G on L2(G) decomposes as the direct sum of all irreducible unitary representations. Moreover, the matrix coefficients of the irreducible unitary representations form an orthonormal basis of L2(G).".
- Q1529941 wikiPageWikiLink Q10130151.
- Q1529941 wikiPageWikiLink Q10359539.
- Q1529941 wikiPageWikiLink Q1046291.
- Q1529941 wikiPageWikiLink Q1050120.
- Q1529941 wikiPageWikiLink Q1055807.
- Q1529941 wikiPageWikiLink Q1057968.
- Q1529941 wikiPageWikiLink Q1162676.
- Q1529941 wikiPageWikiLink Q1202673.
- Q1529941 wikiPageWikiLink Q1340800.
- Q1529941 wikiPageWikiLink Q13582243.
- Q1529941 wikiPageWikiLink Q13690522.
- Q1529941 wikiPageWikiLink Q1428923.
- Q1529941 wikiPageWikiLink Q1530791.
- Q1529941 wikiPageWikiLink Q1555242.
- Q1529941 wikiPageWikiLink Q1632419.
- Q1529941 wikiPageWikiLink Q170058.
- Q1529941 wikiPageWikiLink Q181296.
- Q1529941 wikiPageWikiLink Q1887083.
- Q1529941 wikiPageWikiLink Q1972470.
- Q1529941 wikiPageWikiLink Q217413.
- Q1529941 wikiPageWikiLink Q2365325.
- Q1529941 wikiPageWikiLink Q2608380.
- Q1529941 wikiPageWikiLink Q261527.
- Q1529941 wikiPageWikiLink Q274639.
- Q1529941 wikiPageWikiLink Q288465.
- Q1529941 wikiPageWikiLink Q305936.
- Q1529941 wikiPageWikiLink Q320346.
- Q1529941 wikiPageWikiLink Q326908.
- Q1529941 wikiPageWikiLink Q3527031.
- Q1529941 wikiPageWikiLink Q395.
- Q1529941 wikiPageWikiLink Q4230058.
- Q1529941 wikiPageWikiLink Q4356506.
- Q1529941 wikiPageWikiLink Q5165477.
- Q1529941 wikiPageWikiLink Q5504990.
- Q1529941 wikiPageWikiLink Q57228.
- Q1529941 wikiPageWikiLink Q622679.
- Q1529941 wikiPageWikiLink Q673444.
- Q1529941 wikiPageWikiLink Q71029.
- Q1529941 wikiPageWikiLink Q72599.
- Q1529941 wikiPageWikiLink Q7624589.
- Q1529941 wikiPageWikiLink Q868169.
- Q1529941 wikiPageWikiLink Q876215.
- Q1529941 wikiPageWikiLink Q8851983.
- Q1529941 wikiPageWikiLink Q8851992.
- Q1529941 wikiPageWikiLink Q8867041.
- Q1529941 wikiPageWikiLink Q8911731.
- Q1529941 wikiPageWikiLink Q939927.
- Q1529941 comment "In mathematics, the Peter–Weyl theorem is a basic result in the theory of harmonic analysis, applying to topological groups that are compact, but are not necessarily abelian. It was initially proved by Hermann Weyl, with his student Fritz Peter, in the setting of a compact topological group G (Peter & Weyl 1927). The theorem is a collection of results generalizing the significant facts about the decomposition of the regular representation of any finite group, as discovered by F. G.".
- Q1529941 label "Peter–Weyl theorem".