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|a We find a closed formula for the triple integral on spheres in R2n x R2n x R2n whose kernel is given by powers of the standard symplectic form. This gives a new proof to the Bernstein-Reznikov integral formula in the n = 1 case. Our method also applies for linear and conformal structures.
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Clerc, J.-L., Kobayashi, T., Ørsted, B. |
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We find a closed formula for the triple integral on spheres in R2n x R2n x R2n whose kernel is given by powers of the standard symplectic form. This gives a new proof to the Bernstein-Reznikov integral formula in the n = 1 case. Our method also applies for linear and conformal structures. |
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Clerc, J.-L. aut, Generalized Bernstein-Reznikov integrals T. Kobayashi; B. Ørsted; M. Pevzner, Bonn MPI for Mathematics 2009, Online-Ressource (23 S., 240 KB), Text txt rdacontent, Computermedien c rdamedia, Online-Ressource cr rdacarrier, MPIM / Max-Planck-Institut für Mathematik, Bonn 2009,46, We find a closed formula for the triple integral on spheres in R2n x R2n x R2n whose kernel is given by powers of the standard symplectic form. This gives a new proof to the Bernstein-Reznikov integral formula in the n = 1 case. Our method also applies for linear and conformal structures., Forschungsbericht (DE-588)4155043-2 (DE-627)10467444X (DE-576)209815833 gnd-content, Kobayashi, T. aut, Ørsted, B. aut, Pevzner, M. oth, Max-Planck-Institut für Mathematik Preprints of the Max-Planck-Institut für Mathematik 2009,46 2009046 (DE-627)560926065 (DE-576)281386706 (DE-600)2419030-5, http://webdoc.sub.gwdg.de/ebook/serien/e/mpi_mathematik/2009/2009_46.pdf application/pdf Verlag kostenfrei Volltext, http://webdoc.sub.gwdg.de/ebook/serien/e/mpi_mathematik/2009/2009_46.pdf LFER, LFER 2019-05-07T00:00:00Z |
spellingShingle |
Clerc, J.-L., Kobayashi, T., Ørsted, B., Generalized Bernstein-Reznikov integrals, Max-Planck-Institut für Mathematik, Preprints of the Max-Planck-Institut für Mathematik, 2009,46, We find a closed formula for the triple integral on spheres in R2n x R2n x R2n whose kernel is given by powers of the standard symplectic form. This gives a new proof to the Bernstein-Reznikov integral formula in the n = 1 case. Our method also applies for linear and conformal structures., Forschungsbericht |
swb_id_str |
9611671768 |
title |
Generalized Bernstein-Reznikov integrals |
title_auth |
Generalized Bernstein-Reznikov integrals |
title_full |
Generalized Bernstein-Reznikov integrals T. Kobayashi; B. Ørsted; M. Pevzner |
title_fullStr |
Generalized Bernstein-Reznikov integrals T. Kobayashi; B. Ørsted; M. Pevzner |
title_full_unstemmed |
Generalized Bernstein-Reznikov integrals T. Kobayashi; B. Ørsted; M. Pevzner |
title_in_hierarchy |
2009,46. Generalized Bernstein-Reznikov integrals (2009) |
title_short |
Generalized Bernstein-Reznikov integrals |
title_sort |
generalized bernstein reznikov integrals |
topic |
Forschungsbericht |
topic_facet |
Forschungsbericht |
url |
http://webdoc.sub.gwdg.de/ebook/serien/e/mpi_mathematik/2009/2009_46.pdf |