Harmonic vector fields and the Hodge Laplacian operator on Finsler geometry

Bidabad, Behroz; Mirshafeazadeh, Mir Ahmad

doi:10.5802/crmath.287

Analyse harmonique, Géométrie et Topologie

Harmonic vector fields and the Hodge Laplacian operator on Finsler geometry

Bidabad, Behroz ^1,² ; Mirshafeazadeh, Mir Ahmad ³

¹ Department of Mathematics and Computer Sciences, Amirkabir University of Technology (Tehran Polytechnic), 424 Hafez Ave. 15914 Tehran, Iran
² Institut de Mathematique de Toulouse, Université Paul Sabatier, 118 route de Narbonne, 31062 Toulouse, France
³ Department of Mathematics, Shabestar Branch, Islamic Azad University, Shabestar, Iran

Comptes Rendus. Mathématique, Tome 360 (2022) no. G11, pp. 1193-1204.

Résumé
Abstract

Nous présentons d’abord les définitions naturelles de la différentielle horizontale, de la divergence (comme opérateur adjoint) et d’une forme $p$ -harmonique sur une variété finslérienne. Ensuite, nous prouvons un théorème de type Hodge pour une variété finslérienne dans le sens où une $p$ -forme horizontale est harmonique si et seulement si le Laplacien horizontal est nul. Ce point de vue fournit une nouvelle définition naturelle appropriée des champs de vecteurs harmoniques en géométrie finslérienne. Cette méthode conduit à un théorème de classification de type Bochner–Yano basé sur le scalaire de Ricci harmonique. Enfin, nous montrons qu’une variété finslérienne fermée et orientable, avec un scalaire de Ricci harmonique positif, a un nombre de Betti nul.

We first present the natural definitions of the horizontal differential, the divergence (as an adjoint operator) and a $p$ -harmonic form on a Finsler manifold. Next, we prove a Hodge-type theorem for a Finsler manifold in the sense that a horizontal $p$ -form is harmonic if and only if the horizontal Laplacian vanishes. This viewpoint provides a new appropriate natural definition of harmonic vector fields in Finsler geometry. This approach leads to a Bochner–Yano type classification theorem based on the harmonic Ricci scalar. Finally, we show that a closed orientable Finsler manifold with a positive harmonic Ricci scalar has zero Betti number.

Reçu le : 2021-06-10
Révisé le : 2021-09-28
Accepté le : 2021-10-21
Publié le : 2022-12-08

DOI : 10.5802/crmath.287

Classification : 58B20

Affiliations des auteurs :

Bidabad, Behroz ^{1, 2} ; Mirshafeazadeh, Mir Ahmad ³

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Bidabad, Behroz; Mirshafeazadeh, Mir Ahmad. Harmonic vector fields and the Hodge Laplacian operator on Finsler geometry. Comptes Rendus. Mathématique, Tome 360 (2022) no. G11, pp. 1193-1204. doi : 10.5802/crmath.287. http://archive.numdam.org/articles/10.5802/crmath.287/

Bibliographie
Cité par

[1] Akbar-Zadeh, Hassan Initiation to global Finslerian geometry, North-Holland Mathematical Library, 68, Elsevier, 2006, 250 pages | Zbl

[2] Bao, David; Chern, Shiing-Shen; Shen, Zhongmin An Introduction to Riemann–Finsler geometry, Graduate Texts in Mathematics, 200, Springer, 2000, 431 pages

[3] Bao, David; Lackey, Brad A Hodge decomposition theorem for Finsler spaces, C. R. Math. Acad. Sci. Paris, Volume 323 (1996) no. 1, pp. 51-56 | MR | Zbl

[4] Bertrand, Christine; Rauzy, Antoine Valeurs propres d’opérateurs différentiels du second ordre sur une variété de Finsler, Bull. Sci. Math., Volume 122 (1998) no. 5, pp. 399-408 | DOI | Zbl

[5] Bidabad, Behroz; Shahi, Alireza On Sobolev spaces and density theorems on Finsler manifolds, AUT J. Math. Comput., Volume 1 (2020) no. 1, pp. 37-45

[6] Bochner, Salomon Vector fields and Ricci curvature, Bull. Am. Math. Soc., Volume 52 (1946), pp. 776-797 | DOI | MR | Zbl

[7] Pedersen, Gert K. Analysis Now, Springer, 1994

[8] Qun, He; Wei, Zhao Variation problems and E-valued horizontal harmonic forms on Finsler manifolds, Publ. Math., Volume 82 (2013) no. 2, pp. 325-339 | MR | Zbl

[9] Shahi, Alireza; Bidabad, Behroz Harmonic vector fields on Landsberg manifolds, C. R. Math. Acad. Sci. Paris, Volume 352 (2014) no. 9, pp. 737-741 | DOI | MR | Zbl

[10] Shahi, Alireza; Bidabad, Behroz Harmonic vector fields on Finsler manifolds, C. R. Math. Acad. Sci. Paris, Volume 354 (2016) no. 1, pp. 101-106 | DOI | MR | Zbl

[11] Shen, Yi-Bing; Shen, Zhongmin Introduction to modern Finsler geometry, Higher Education Press, 2016, 393 pages | DOI

[12] Yano, Kentaro On harmonic and Killing vector fields, Ann. Math., Volume 55 (1952), pp. 38-45 | DOI | MR | Zbl

[13] Yano, Kentaro Integral Formulas in Riemannian Geometry, Pure and Applied Mathematics, 1, Marcel Dekker, 1970

[14] Zhong, Chunping; Zhong, Tongde Horizontal Laplace operator in real Finsler vector bundles, Acta Math. Sci., Volume 28 (2008) no. 1, pp. 128-140 | DOI | MR | Zbl

Cité par Sources :