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Harmonic Maps and Bi-Harmonic Maps on CR-Manifolds and Foliated Riemannian Manifolds

Harmonic Maps and Bi-Harmonic Maps on CR-Manifolds and Foliated Riemannian Manifolds
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摘要 This is a survey on our recent works on bi-harmonic maps on CR-manifolds and foliated Riemannian manifolds, and also a research paper on bi-harmonic maps principal G-bundles. We will show, (1) for a complete strictly pseudoconvex CR manifold , every pseudo bi-harmonic isometric immersion  into a Riemannian manifold of non-positive curvature, with finite energy and finite bienergy, must be pseudo harmonic;(2) for a smooth foliated map of a complete, possibly non-compact, foliated Riemannian manifold into another foliated Riemannian manifold, of which transversal sectional curvature is non-positive, we will show that if it is transversally bi-harmonic map with the finite energy and finite bienergy, then it is transversally harmonic;(3) we will claim that the similar result holds for principal G-bundle over a Riemannian manifold of negative Ricci curvature. This is a survey on our recent works on bi-harmonic maps on CR-manifolds and foliated Riemannian manifolds, and also a research paper on bi-harmonic maps principal G-bundles. We will show, (1) for a complete strictly pseudoconvex CR manifold , every pseudo bi-harmonic isometric immersion  into a Riemannian manifold of non-positive curvature, with finite energy and finite bienergy, must be pseudo harmonic;(2) for a smooth foliated map of a complete, possibly non-compact, foliated Riemannian manifold into another foliated Riemannian manifold, of which transversal sectional curvature is non-positive, we will show that if it is transversally bi-harmonic map with the finite energy and finite bienergy, then it is transversally harmonic;(3) we will claim that the similar result holds for principal G-bundle over a Riemannian manifold of negative Ricci curvature.
作者 Shinji Ohno Takashi Sakai Hajime Urakawa Shinji Ohno;Takashi Sakai;Hajime Urakawa(Osaka City University Advanced Mathematical Institute (OCAMI), Osaka, Japan;Department of Mathematics and Information Sciences, Tokyo Metropolitan University, Hachioji, Japan;Institute for International Education, Global Learning Center, Tohoku University, Sendai, Japan)
出处 《Journal of Applied Mathematics and Physics》 2016年第12期2272-2289,共18页 应用数学与应用物理(英文)
关键词 FOLIATION Divergence Theorem Transversally Harmonic Transversally Biharmonic Foliation Divergence Theorem Transversally Harmonic Transversally Biharmonic
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