Holomorphic Frames for Weakly Converging Holomorphic Vector Bundles

AbstractUsing a modification of Webster's proof of the Newlander–Nirenberg theorem, it is shown that, for a weakly convergent sequence of integrable unitary connections on a complex vector bundle over a complex manifold, there is a subsequence of local holomorphic frames that converges strongly in an appropriate Holder class.

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Holomorphic Vector Bundles on Holomorphically Convex Complex Manifolds

Georgian Mathematical Journal ◽

10.1515/gmj.2006.7 ◽

2006 ◽

Vol 13 (1) ◽

pp. 7-10

Author(s):

Edoardo Ballico

Keyword(s):

Vector Bundle ◽

Complex Manifold ◽

Vector Bundles ◽

Open Neighborhood ◽

Holomorphic Vector Bundle ◽

Stein Manifold ◽

Complex Manifolds ◽

Holomorphic Vector Bundles

Abstract Let 𝑋 be a holomorphically convex complex manifold and Exc(𝑋) ⊆ 𝑋 the union of all positive dimensional compact analytic subsets of 𝑋. We assume that Exc(𝑋) ≠ 𝑋 and 𝑋 is not a Stein manifold. Here we prove the existence of a holomorphic vector bundle 𝐸 on 𝑋 such that is not holomorphically trivial for every open neighborhood 𝑈 of Exc(𝑋) and every integer 𝑚 ≥ 0. Furthermore, we study the existence of holomorphic vector bundles on such a neighborhood 𝑈, which are not extendable across a 2-concave point of ∂(𝑈).

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A REMARK ON THE STABLE REAL FORMS OF COMPLEX VECTOR BUNDLES OVER MANIFOLDS

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972717000132 ◽

2017 ◽

Vol 96 (1) ◽

pp. 69-76

Author(s):

HUIJUN YANG

Keyword(s):

Vector Bundle ◽

Smooth Manifold ◽

Vector Bundles ◽

Characteristic Classes ◽

Dimensional Manifold ◽

Real Form ◽

Complex Vector Bundle ◽

Complex Vector ◽

Simply Connected ◽

Real Forms

Let$M$be an$n$-dimensional closed oriented smooth manifold with$n\equiv 4\;\text{mod}\;8$, and$\unicode[STIX]{x1D702}$be a complex vector bundle over$M$. We determine the final obstruction for$\unicode[STIX]{x1D702}$to admit a stable real form in terms of the characteristic classes of$M$and$\unicode[STIX]{x1D702}$. As an application, we obtain the criteria to determine which complex vector bundles over a simply connected four-dimensional manifold admit a stable real form.

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On complex vector bundles on rational threefolds

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100062824 ◽

1985 ◽

Vol 97 (2) ◽

pp. 279-288 ◽

Cited By ~ 3

Author(s):

Constantin BẮnicẮ ◽

Mihai Putinar

Keyword(s):

Vector Bundle ◽

Algebraic Structure ◽

Vector Bundles ◽

Topological Type ◽

Rational Surface ◽

Chern Classes ◽

Complex Vector Bundle ◽

Complex Vector ◽

Algebraic Vector ◽

Rank 2

It is known [14] that every topological complex vector bundle on a smooth rational surface admits an algebraic structure. In [10] one constructs algebraic vector bundles of rank 2 on with arbitrary Chern classes c1, c2 subject to the necessary topological condition c1 c2 = 0 (mod 2). However, in dimensions greater than 2 the Chern classes don't determine the topological type of a vector bundle. In [2] one classifies the topological complex vector bundles of rank 2 on and one proves that any such bundle admits an algebraic structure.

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OBSTRUCTIONS TO ALGEBRAIZING TOPOLOGICAL VECTOR BUNDLES

Forum of Mathematics Sigma ◽

10.1017/fms.2018.16 ◽

2019 ◽

Vol 7 ◽

Author(s):

A. ASOK ◽

J. FASEL ◽

M. J. HOPKINS

Keyword(s):

Vector Bundle ◽

Complex Manifold ◽

Algebraic Variety ◽

Vector Bundles ◽

Necessary Condition ◽

Chern Classes ◽

Smooth Complex ◽

Steenrod Operations ◽

Complex Algebraic Variety ◽

Cycle Class

Suppose $X$ is a smooth complex algebraic variety. A necessary condition for a complex topological vector bundle on $X$ (viewed as a complex manifold) to be algebraic is that all Chern classes must be algebraic cohomology classes, that is, lie in the image of the cycle class map. We analyze the question of whether algebraicity of Chern classes is sufficient to guarantee algebraizability of complex topological vector bundles. For affine varieties of dimension ${\leqslant}3$, it is known that algebraicity of Chern classes of a vector bundle guarantees algebraizability of the vector bundle. In contrast, we show in dimension ${\geqslant}4$ that algebraicity of Chern classes is insufficient to guarantee algebraizability of vector bundles. To do this, we construct a new obstruction to algebraizability using Steenrod operations on Chow groups. By means of an explicit example, we observe that our obstruction is nontrivial in general.

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First Chern class and holomorphic tensor fields

Nagoya Mathematical Journal ◽

10.1017/s0027763000018602 ◽

1980 ◽

Vol 77 ◽

pp. 5-11 ◽

Cited By ~ 26

Author(s):

Shoshichi Kobayashi

Keyword(s):

Vector Bundle ◽

Cotangent Bundle ◽

Symmetric Tensor ◽

Complex Vector Bundle ◽

Tensor Fields ◽

Kaehler Manifold ◽

Complex Vector ◽

Tensor Power ◽

Holomorphic Sections ◽

First Chern Class

Let M be an n-dimensional compact Kaehler manifold, TM its (holomorphic) tangent bundle and T*M its cotangent bundle. Given a complex vector bundle E over M, we denote its m-th symmetric tensor power by SmE and the space of holomorphic sections of E by Γ(E).

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Splitting ℂP∞ and Bℤ/pn into Thom spectra

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100078087 ◽

1989 ◽

Vol 106 (2) ◽

pp. 263-271 ◽

Cited By ~ 3

Author(s):

Brayton Gray ◽

Nigel Ray

Keyword(s):

Vector Bundle ◽

Algebraic Topology ◽

Steenrod Algebra ◽

Complex Vector Bundle ◽

Complex Vector ◽

Thom Spectra ◽

Stable Splitting ◽

Image Position

In recent years, much work in algebraic topology has been devoted to stable splitting phenomena. Often the existence of these splittings has first been detected at the cohomological level in terms of modules over the Steenrod algebra.For example, W. Richter has exhibited a decomposition of ΩSU(n) of the form(see [7]). Not only were cohomology calculations the initial evidence for this situation, but they further suggested that each summand Gk might be the Thom complex of a suitable k-plane complex vector bundle. This possibility was also verified by Mitchell.

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Chern Classes of Projective Modules

Nagoya Mathematical Journal ◽

10.1017/s0027763000011223 ◽

1963 ◽

Vol 23 ◽

pp. 121-152 ◽

Cited By ~ 5

Author(s):

Hideki Ozeki

Keyword(s):

Vector Bundle ◽

Cross Sections ◽

Chern Class ◽

Vector Bundles ◽

Stein Manifold ◽

Projective Modules ◽

Singular Variety ◽

Differentiable Functions ◽

Holomorphic Vector Bundles ◽

Differentiable Vector

In topology, one can define in several ways the Chern class of a vector bundle over a certain topological space (Chern [2], Hirzebruch [7], Milnor [9], Steenrod [15]). In algebraic geometry, Grothendieck has defined the Chern class of a vector bundle over a non-singular variety. Furthermore, in the case of differentiable vector bundles, one knows that the set of differentiable cross-sections to a bundle forms a finitely generated projective module over the ring of differentiable functions on the base manifold. This gives a one to one correspondence between the set of vector bundles and the set of f.g.-projective modules (Milnor [10]). Applying Grauert’s theorems (Grauert [5]), one can prove that the same statement holds for holomorphic vector bundles over a Stein manifold.

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A Note on Holomorphic Vector Bundles Over Quotient Manifolds With Respect to Nilpotent Groups

Nagoya Mathematical Journal ◽

10.1017/s0027763000015178 ◽

1972 ◽

Vol 48 ◽

pp. 183-188

Author(s):

Hisasi Morikawa

Keyword(s):

Vector Bundle ◽

Endomorphism Ring ◽

Vector Bundles ◽

Holomorphic Vector Bundle ◽

Nilpotent Groups ◽

Projective Bundle ◽

Analytic Manifold ◽

Transition Functions ◽

Holomorphic Vector Bundles ◽

Complex Analytic Manifold

A holomorphic vector bundle E over a complex analytic manifold is said to be simple, if its global endomorphism ring Endc (E) is isomorphic to C. Projectifying the fibers of E, we get the associated projective bundle P(E) of E, If we can choose a system of constant transition functions of P(Exs), the projective bundle P(E) is said to be locally flat.

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A Note on Holomorphic Vector Bundles Over Complex Tori

Nagoya Mathematical Journal ◽

10.1017/s0027763000014100 ◽

1971 ◽

Vol 41 ◽

pp. 101-106 ◽

Cited By ~ 12

Author(s):

Hisasi Morikawa

Keyword(s):

Quotient Group ◽

Vector Bundles ◽

Additive Group ◽

Complex Vector ◽

Complex Torus ◽

Holomorphic Vector Bundles ◽

Complex Tori

Let (ω: Z2r→Cr be an isomorphism of the free additive group of rank 2r into the complex vector n-space such that the quotient group T = Crω/(Z2r) is compact, i.e., Tω is a complex torus.

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Homogeneous vector bundles and stability

Nagoya Mathematical Journal ◽

10.1017/s0027763000000337 ◽

1986 ◽

Vol 101 ◽

pp. 37-54 ◽

Cited By ~ 4

Author(s):

Shoshichi Kobayashi

Keyword(s):

Vector Bundle ◽

Complex Manifold ◽

Matrix Function ◽

Vector Bundles ◽

Hermitian Matrix ◽

Holomorphic Vector Bundle ◽

Positive Definite ◽

Frame Field ◽

Hermitian Vector Bundle ◽

Homogeneous Vector

In [5, 6, 7] I introduced the concept of Einstein-Hermitian vector bundle. Let E be a holomorphic vector bundle of rank r over a complex manifold M. An Hermitian structure h in E can be expressed, in terms of a local holomorphic frame field s1, …, sr of E, by a positive-definite Hermitian matrix function (hij) defined by

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