Titlebook: Riemannian Geometry; Sylvestre Gallot,Dominique Hulin,Jacques Lafontain Textbook 19871st edition Springer-Verlag Berlin Heidelberg 1987 Ri

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Curvature,e . is a vector field such that . = .. We already met in 2.64 the second covariant derivative of a function, which is a symmetric 2-tensor. This property is no more true for the second derivative of a tensor. However, . only depends on ..

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Analysis on Manifolds and the Ricci Curvature,ignore mathematical beings which locally behave like domains on ., just as manifolds locally behave like .. On the other hand, when doing Analysis on manifolds, it may useful to cut them into small pieces (cf. for example 4.65 and 4.68 below). These pieces are no more manifolds, but they will be manifolds with boundary.

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0172-5939 m of (sn, can) F. THE MINIMAX PRINCIPLE 177 The basic statements VIII G. THE RICCI CURVATURE AND EIGENVALUES ESTIMATES Introduction 181 Bishop‘s inequality and 978-3-642-97026-9Series ISSN 0172-5939 Series E-ISSN 2191-6675

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Sylvestre Gallot,Dominique Hulin,Jacques Lafontaine

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