具有黎曼度量的仿射流形切丛序列的Hermitian结构

IF 0.5 Q3 MATHEMATICS Complex Manifolds Pub Date : 2021-06-23 DOI:10.1515/coma-2021-0128
M. Boucetta
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引用次数: 0

摘要

摘要设(M,Ş,〈,〉)是一个具有平坦无扭连接r和黎曼度量〈,〉的流形,并且(TkM)k≥1是由TkM=T(Tk−1M)和T1M=TM给出的切丛序列,TkM带有一个埃尔米特结构(Jk,gk)和一个平坦的无扭连接,当M是一个李群并且(Ş,〈,〉)是左不变的时,在每个TkM上都有一个李群结构,使得(Jk、gk、Şk)是左不变量。众所周知,(TM,J1,g1)是Kähler当且仅当〈,〉是Hessian,即,在每个仿射坐标系(x1,…,xn)中,〈xi,〈xj〉=。考虑到最近引入的Kähler条件的许多推广,我们给出了(Ş,〈,〉)上的条件,使得(TM,J1,g1)是平衡的,局部保形平衡的,具有扭转的局部保形Kächler,多闭的,Gauduchon,Vaisman或Calabi-Yau。此外,我们可以在(Ş,〈,〉)的水平上控制保证它们中的一些(TkM,Jk,gk)或全部满足广义Kähler条件的条件。例如,我们证明了存在一些类(M,Ş,〈,〉),使得对于任何k≥1,(TkM,Jk,gk)是平衡的非kähler和Calabi-Yau与扭转。通过仔细研究(M,Ş,〈,〉)的几何,我们开发了一个强大的机制来构建一大类广义Kähler流形。
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On the Hermitian structures of the sequence of tangent bundles of an affine manifold endowed with a Riemannian metric
Abstract Let (M, ∇, 〈, 〉) be a manifold endowed with a flat torsionless connection r and a Riemannian metric 〈, 〉 and (TkM)k≥1 the sequence of tangent bundles given by TkM = T(Tk−1M) and T1M = TM. We show that, for any k ≥ 1, TkM carries a Hermitian structure (Jk, gk) and a flat torsionless connection ∇k and when M is a Lie group and (∇, 〈, 〉) are left invariant there is a Lie group structure on each TkM such that (Jk, gk, ∇k) are left invariant. It is well-known that (TM, J1, g1) is Kähler if and only if 〈, 〉 is Hessian, i.e, in each system of affine coordinates (x1, . . ., xn), 〈 ∂xi,∂xj 〉=∂2φ∂xi∂xj \left\langle {{\partial _x}_{_i},{\partial _{{x_j}}}} \right\rangle = {{{\partial ^2}\phi } \over {{\partial _x}_{_i}{\partial _x}_j}} . Having in mind many generalizations of the Kähler condition introduced recently, we give the conditions on (∇, 〈, 〉) so that (TM, J1, g1) is balanced, locally conformally balanced, locally conformally Kähler, pluriclosed, Gauduchon, Vaisman or Calabi-Yau with torsion. Moreover, we can control at the level of (∇, 〈, 〉) the conditions insuring that some (TkM, Jk, gk) or all of them satisfy a generalized Kähler condition. For instance, we show that there are some classes of (M, ∇, 〈, 〉) such that, for any k ≥ 1, (TkM, Jk, gk) is balanced non-Kähler and Calabi-Yau with torsion. By carefully studying the geometry of (M, ∇, 〈, 〉), we develop a powerful machinery to build a large classes of generalized Kähler manifolds.
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来源期刊
Complex Manifolds
Complex Manifolds MATHEMATICS-
CiteScore
1.30
自引率
20.00%
发文量
14
审稿时长
25 weeks
期刊介绍: Complex Manifolds is devoted to the publication of results on these and related topics: Hermitian geometry, Kähler and hyperkähler geometry Calabi-Yau metrics, PDE''s on complex manifolds Generalized complex geometry Deformations of complex structures Twistor theory Geometric flows on complex manifolds Almost complex geometry Quaternionic geometry Geometric theory of analytic functions Holomorphic dynamics Several complex variables Dolbeault cohomology CR geometry.
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