Structure of the complementary series and special representations of the groups O(n,1) and U(n,1)
Identifieur interne : 000A12 ( Istex/Corpus ); précédent : 000A11; suivant : 000A13Structure of the complementary series and special representations of the groups O(n,1) and U(n,1)
Auteurs :Source :
- Russian Mathematical Surveys [ 0036-0279 ] ; 2006-10-31.
English descriptors
- KwdEn :
- Academic press, Akad, Anal, Bargmann, Bargmann model, Berezin, Bessel, Bessel function, Block matrices, Boundary values, Canonical, Canonical representation, Canonical representations, Canonical state, Canonical states, Cocycles, Codimension, Cohomology, Commutative, Commutative model, Compact group, Complementary, Complementary series, Complementary series representation, Complementary series representations, Const, Cosh, Current group, Current groups, Degenerate, Delta function, Diag, Direct integral, Direct integrals, Embedding, English transl, Explicit expression, Explicit formulae, Fourier, Generalized functions, Graev, Graev model, Graev proposition, Group property, Harmonic analysis, Heisenberg, Heisenberg group, Heisenberg subgroup, Hermitian, Hermitian forms, Hilbert, Hilbert space, Hilbert space isomorphism, Hilbert spaces, Homogeneous polynomials, Homogeneous space, Identity matrix, Identity representation, Inner products, Invariant measure, Invariant subspace, Invariant subspaces, Invariant vectors, Irreducible, Irreducible representation, Irreducible representations, Irreducible subspaces, Isometric embedding, Isomorphism, Lebesgue, Lebesgue measure, Lecture notes, Linear transformations, Matrix, Matrix model, Maximal, Maximal parabolic subgroup, Maximal unipotent subgroup, Monomials, Nauk, Nauka, Norm, Orthogonal, Orthogonal basis, Other hand, Other words, Pairwise, Pairwise equivalent, Parabolic, Power series, Quotient, Quotient space, Reducible, Representation, Representation theory, Russian math, Same formulae, Sinh, Special representation, Special representations, Spherical coordinates, Spherical function, Spherical functions, Squared, Squared norm, Squared norms, Subgroup, Subspace, Tensor, Tensor product, Tensor products, Transl, Unipotent, Unipotent subgroup, Unit ball, Unit sphere, Unitarity, Unitary, Unitary representation, Unitary representations, Unitary unit sphere, Vacuum vector, Vershik, Whole group.
- Teeft :
- Academic press, Akad, Anal, Bargmann, Bargmann model, Berezin, Bessel, Bessel function, Block matrices, Boundary values, Canonical, Canonical representation, Canonical representations, Canonical state, Canonical states, Cocycles, Codimension, Cohomology, Commutative, Commutative model, Compact group, Complementary, Complementary series, Complementary series representation, Complementary series representations, Const, Cosh, Current group, Current groups, Degenerate, Delta function, Diag, Direct integral, Direct integrals, Embedding, English transl, Explicit expression, Explicit formulae, Fourier, Generalized functions, Graev, Graev model, Graev proposition, Group property, Harmonic analysis, Heisenberg, Heisenberg group, Heisenberg subgroup, Hermitian, Hermitian forms, Hilbert, Hilbert space, Hilbert space isomorphism, Hilbert spaces, Homogeneous polynomials, Homogeneous space, Identity matrix, Identity representation, Inner products, Invariant measure, Invariant subspace, Invariant subspaces, Invariant vectors, Irreducible, Irreducible representation, Irreducible representations, Irreducible subspaces, Isometric embedding, Isomorphism, Lebesgue, Lebesgue measure, Lecture notes, Linear transformations, Matrix, Matrix model, Maximal, Maximal parabolic subgroup, Maximal unipotent subgroup, Monomials, Nauk, Nauka, Norm, Orthogonal, Orthogonal basis, Other hand, Other words, Pairwise, Pairwise equivalent, Parabolic, Power series, Quotient, Quotient space, Reducible, Representation, Representation theory, Russian math, Same formulae, Sinh, Special representation, Special representations, Spherical coordinates, Spherical function, Spherical functions, Squared, Squared norm, Squared norms, Subgroup, Subspace, Tensor, Tensor product, Tensor products, Transl, Unipotent, Unipotent subgroup, Unit ball, Unit sphere, Unitarity, Unitary, Unitary representation, Unitary representations, Unitary unit sphere, Vacuum vector, Vershik, Whole group.
Url:
DOI: 10.1070/RM2006v061n05ABEH004356
Links to Exploration step
ISTEX:301CD45A2F2D2B0C59A49EA1398A01FFA8E8EA99Le document en format XML
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Pyatetskii-Shapiro</json:string><json:string>H. Denote</json:string><json:string>A. Je</json:string><json:string>A. Erd</json:string><json:string>N. Tsilevich</json:string><json:string>A. Valette</json:string><json:string>X. Remark</json:string><json:string>A. Vershik</json:string><json:string>M. Yor</json:string><json:string>G. De</json:string><json:string>London Math</json:string><json:string>S. Remark</json:string><json:string>I. S. Gradshteyn</json:string><json:string>S. G. Petrova</json:string></persName><placeName><json:string>San Diego</json:string><json:string>Chur</json:string><json:string>Heidelberg</json:string><json:string>Model</json:string><json:string>Grenoble</json:string><json:string>Moscow</json:string><json:string>Enschede</json:string><json:string>Toronto</json:string><json:string>Manchester</json:string><json:string>CA</json:string><json:string>York</json:string><json:string>Cambridge</json:string><json:string>Budapest</json:string></placeName><ref_url></ref_url><ref_bibl><json:string>[34]</json:string><json:string>[6]</json:string><json:string>[44]</json:string><json:string>Zvenigorod 1982</json:string><json:string>[8]</json:string><json:string>[17]</json:string><json:string>[1]</json:string><json:string>[54]</json:string><json:string>[49]</json:string><json:string>Budapest 1971</json:string><json:string>[3]</json:string><json:string>Probability and Statistics 1970</json:string><json:string>[53]</json:string><json:string>[5]</json:string><json:string>[48]</json:string><json:string>[52]</json:string><json:string>[7]</json:string><json:string>[14]</json:string><json:string>[9]</json:string><json:string>[2]</json:string><json:string>[35]</json:string></ref_bibl><bibl></bibl></unitex></namedEntities><ark><json:string>ark:/67375/0T8-MK8XQ0N8-0</json:string></ark><categories><wos><json:string>1 - science</json:string><json:string>2 - mathematics</json:string></wos><scienceMetrix><json:string>1 - natural sciences</json:string><json:string>2 - mathematics & statistics</json:string><json:string>3 - general mathematics</json:string></scienceMetrix><scopus><json:string>1 - Physical Sciences</json:string><json:string>2 - Mathematics</json:string><json:string>3 - General Mathematics</json:string></scopus></categories><publicationDate>2006</publicationDate><copyrightDate>2006</copyrightDate><doi><json:string>10.1070/RM2006v061n05ABEH004356</json:string></doi><id>301CD45A2F2D2B0C59A49EA1398A01FFA8E8EA99</id><score>1</score><fulltext><json:item><extension>pdf</extension><original>true</original><mimetype>application/pdf</mimetype><uri>https://api.istex.fr/document/301CD45A2F2D2B0C59A49EA1398A01FFA8E8EA99/fulltext/pdf</uri></json:item><json:item><extension>zip</extension><original>false</original><mimetype>application/zip</mimetype><uri>https://api.istex.fr/document/301CD45A2F2D2B0C59A49EA1398A01FFA8E8EA99/fulltext/zip</uri></json:item><istex:fulltextTEI uri="https://api.istex.fr/document/301CD45A2F2D2B0C59A49EA1398A01FFA8E8EA99/fulltext/tei"><teiHeader><fileDesc><titleStmt><title level="a" type="main" xml:lang="en">Structure of the complementary series and special representations of the groups O(n,1) and U(n,1)</title><respStmt><resp>Références bibliographiques récupérées via GROBID</resp><name resp="ISTEX-API">ISTEX-API (INIST-CNRS)</name></respStmt></titleStmt><publicationStmt><authority>ISTEX</authority><publisher scheme="https://publisher-list.data.istex.fr">Institute Of Physics</publisher><pubPlace>Bristol</pubPlace><availability><licence><p>© 2006 Russian Academy of Sciences, (DoM) and London Mathematical Society, Turpion Ltd</p></licence><p scheme="https://loaded-corpus.data.istex.fr/ark:/67375/XBH-4D4R3TJT-T">IOP</p></availability><date>2006</date></publicationStmt><notesStmt><note type="other" scheme="https://content-type.data.istex.fr/ark:/67375/XTP-7474895G-0">other</note><note type="journal" scheme="https://publication-type.data.istex.fr/ark:/67375/JMC-0GLKJH51-B">journal</note></notesStmt><sourceDesc><biblStruct type="inbook"><analytic><title level="a" type="main" xml:lang="en">Structure of the complementary series and special representations of the groups O(n,1) and U(n,1)</title><author xml:id="author-0000"><name type="person">A M Vershik</name><affiliation>St. Petersburg Branch of the V.A. 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