ARIA
发表于 2025-3-23 11:06:31
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Daily-Value
发表于 2025-3-23 15:36:05
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Observe
发表于 2025-3-23 21:42:25
A Review of Covariant Derivative Operators in Complex Vector Bundlesy be found in . For the same reason as in Section 2.5, that since there is a one-to-one correspondence between covariant derivative operators and connections, a covariant derivative operator will be called a connection. We will assume that every object in hand is smooth unless otherwise stated.
潜移默化
发表于 2025-3-24 02:01:45
Book 1996 fields are obtained purely from the algebraic point of view without referring to their geometric origin. Chapter II is devoted to a review of covariant derivative operators in real vector bundles. Chapter III is the main part of this book where, intrinsically, the Koszul connection is introduced an
陈腐思想
发表于 2025-3-24 04:14:27
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SLING
发表于 2025-3-24 09:57:11
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obnoxious
发表于 2025-3-24 10:56:59
A Review of Covariant Derivative Operators in Complex Vector Bundlesy be found in . For the same reason as in Section 2.5, that since there is a one-to-one correspondence between covariant derivative operators and connections, a covariant derivative operator will be called a connection. We will assume that every object in hand is smooth unless otherwise stated.
Coronary
发表于 2025-3-24 15:20:46
Hermitian Submanifolds of Nondegenerate Kähler Manifoldsariant under . if and only if . is a complex submanifold of ., since the vanishing torsion tensor . of . on . implies that . is also vanishing on .. (see Theorem 6.2.2 for the details). Now, let . be a complex submanifold of a nondegenerate Kähler manifold (., ., .) of complex type (., .) and let ..
MUTED
发表于 2025-3-24 22:46:04
Hermitian Submanifolds of Nondegenerate Kähler ManifoldsAlso note that, since . and N. are invariant under ., .┴ and .. are invariant under . and, therefore, we will use the same notation . for the restrictions of the canonical almost complex structure . of . to ., .┴ and ...
使高兴
发表于 2025-3-25 00:38:20
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