Pizzetti formula on the Grassmannian of 2-planes

D. Eelbode; Y. Homma

doi:10.1007/s10455-020-09731-8

Pizzetti formula on the Grassmannian of 2-planes

D. Eelbode^*, Y. Homma

^*Corresponding author for this work

School of Fundamental Science and Engineering

Research output: Contribution to journal › Article › peer-review

Abstract

This paper is devoted to the role played by the Higgs algebra H₃ in the generalisation of classical harmonic analysis from the sphere S^m^-¹ to the (oriented) Grassmann manifold Gr _o(m, 2) of 2-planes. This algebra is identified as the dual partner (in the sense of Howe duality) of the orthogonal group SO (m) acting on functions on the Grassmannian. This is then used to obtain a Pizzetti formula for integration over this manifold. The resulting formulas are finally compared to formulas obtained earlier for the Pizzetti integration over Stiefel manifolds, using an argument involving symmetry reduction.

Original language	English
Pages (from-to)	325-350
Number of pages	26
Journal	Annals of Global Analysis and Geometry
Volume	58
Issue number	3
DOIs	https://doi.org/10.1007/s10455-020-09731-8
Publication status	Published - 2020 Oct 1

ASJC Scopus subject areas

Analysis
Political Science and International Relations
Geometry and Topology

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10.1007/s10455-020-09731-8

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abstract = "This paper is devoted to the role played by the Higgs algebra H3 in the generalisation of classical harmonic analysis from the sphere Sm-1 to the (oriented) Grassmann manifold Gr o(m, 2) of 2-planes. This algebra is identified as the dual partner (in the sense of Howe duality) of the orthogonal group SO (m) acting on functions on the Grassmannian. This is then used to obtain a Pizzetti formula for integration over this manifold. The resulting formulas are finally compared to formulas obtained earlier for the Pizzetti integration over Stiefel manifolds, using an argument involving symmetry reduction.",

author = "D. Eelbode and Y. Homma",

note = "Funding Information: This research was supported by the Fund for Scientific Research-Flanders (FWO-Vlaanderen), Project {\textquoteleft}Construction of algebra realisations using Dirac operators{\textquoteright}, Grant G.0116.13N. The second author was partially supported by JSPS KAKENHI Grant Number JP19K03480. Funding Information: This research was supported by the Fund for Scientific Research-Flanders (FWO-Vlaanderen), Project ?Construction of algebra realisations using Dirac operators?, Grant G.0116.13N. The second author was partially supported by JSPS KAKENHI Grant Number JP19K03480. Publisher Copyright: {\textcopyright} 2020, Springer Nature B.V.",

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N2 - This paper is devoted to the role played by the Higgs algebra H3 in the generalisation of classical harmonic analysis from the sphere Sm-1 to the (oriented) Grassmann manifold Gr o(m, 2) of 2-planes. This algebra is identified as the dual partner (in the sense of Howe duality) of the orthogonal group SO (m) acting on functions on the Grassmannian. This is then used to obtain a Pizzetti formula for integration over this manifold. The resulting formulas are finally compared to formulas obtained earlier for the Pizzetti integration over Stiefel manifolds, using an argument involving symmetry reduction.

AB - This paper is devoted to the role played by the Higgs algebra H3 in the generalisation of classical harmonic analysis from the sphere Sm-1 to the (oriented) Grassmann manifold Gr o(m, 2) of 2-planes. This algebra is identified as the dual partner (in the sense of Howe duality) of the orthogonal group SO (m) acting on functions on the Grassmannian. This is then used to obtain a Pizzetti formula for integration over this manifold. The resulting formulas are finally compared to formulas obtained earlier for the Pizzetti integration over Stiefel manifolds, using an argument involving symmetry reduction.

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Pizzetti formula on the Grassmannian of 2-planes

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