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Familien holomorpher Vektorraumbündel über der projektiven Geraden und unzerlegbare holomorphe 2-Bündel über der projektiven Ebene /Mülich, Gerhard, January 1974 (has links)
Thesis--Göttingen. / Vita. Includes bibliographical references (p. 53-54).
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Notions of positivity for vector bundles /Jabbusch, Kelly. January 2007 (has links)
Thesis (Ph. D.)--University of Washington, 2007. / Vita. Includes bibliographical references (p. 63-65).
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Criteria for positive and ample vector bundlesFrankel, Robert Samuel, January 1976 (has links)
Thesis--Wisconsin. / Vita. Includes bibliographical references (leaf 42).
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Contribution to the theory of stably trivial vector bundlesAllard, Jacques January 1977 (has links)
A vector bundle E over a CW-complex X is said to be stably
trivial of type (n,k) if E, © ke = ne, where e denotes the trivial
line bundle. Let V[sub n,k] , be the Stiefel manifold of orthonormal k-
frame in euclidian n-space R[sup n] and let n[sub n,k] , be the real (n-k)-
dimensional vector bundle over V[sub n,l] , whose fiber over a k—frame x
is the subspace of R[sup n] orthogonal to the span of the vectors in x . The vector bundle n[sub n,k], is "weakly universal" for stably trivial vector bundles of type (n,k), i.e. for any stably trivial vector bundle of type (n,k), there is a map f: X -> V[sub n,k] , not necessarily unique
up to homotopy, such that f *n[sub n,k] = E, .
We study the following questions: (a) for which values of r is
the r-fold Whitney sum rn[sub n,k] , trivial, and (b) what is the maximum
number of linearly independent cross-sections of n[sub n,k] ©[sup se]
(0 < s < k - 1) . Among the results obtained are: (1) 2n[sub n,2] is trivial iff n is even or n=3; (2) 3n[sub n,2] is trivial if n is
even; (3) rn[sub n,k], is not trivial if r is odd and < (n-2)/(n-k):
(4) n[sub n,k] © (k-l)c is not trivial if n ≄ 2,4,8 and 1 < k < n - 3;
(5) n[sub n,k] © [sup se] admits exactly s linearly independent cross-sections
if n and k are odd; (6) n[sub n,k] © (k-2)e admits at most (k-1)
linearly independent sections if 2<_k<_n-3.
These results are used to construct examples of stably free modules and unimodular matrices over commutative noetherian rings.
The techniques used are those of homotopy theory, including Postnikov systems, K-theory and, specially, Spin operations on vector
bundles. A chapter of the thesis is devoted to defining the Spin operations formally as a type of K-theoretic characteristic classes for a certain type of real vector bundles. Formulae to compute the Spin operations on a Whitney sum of vector bundles are given. / Science, Faculty of / Mathematics, Department of / Graduate
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On the energy of Riemannian subbundlesWeston, Jane M. January 2000 (has links)
No description available.
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Stable bundles and branched coverings over Riemann surfacesOxbury, W. January 1987 (has links)
No description available.
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Topics related to vector bundles on abelian varietiesGrieve, NATHAN 25 June 2013 (has links)
This thesis is comprised of three logically independent parts. As the title suggests, each part is related to vector bundles on abelian varieties.
We first use Brill-Noether theory to study the geometry of a general curve in its canonical embedding. We prove that there is no $g$ for which the canonical embedding of a general curve of genus $g$ lies on the Segre embedding of any product of three or more projective spaces.
We then consider non-degenerate line bundles on abelian varieties. Central to our work is Mumford's index theorem. We give an interpretation of this theorem, and then prove that non-degenerate line bundles, with nonzero index, exhibit positivity analogous to ample line bundles.
As an application, we determine the asymptotic behaviour of families of cup-product maps. Using this result, we prove that vector bundles, which are associated to these families, are asymptotically globally generated.
To illustrate our results, we consider explicit examples. We also prove that simple abelian varieties, for which our results apply in all possible instances, exist. This is achieved by considering a particular class of abelian varieties with real multiplication.
The final part of this thesis concerns the theory of theta and adelic theta groups. We extend and refine work of Mumford, Umemura, and Mukai.
For example, we determine the structure and representation theory of theta groups associated to a class of vector bundles which we call simple semi-homogeneous vector bundles of separable type. We also construct, and clarify functorial properties enjoyed by, adelic theta groups associated to line bundles. / Thesis (Ph.D, Mathematics & Statistics) -- Queen's University, 2013-06-24 17:14:21.687
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Moduli of bundles on local surfaces and threefoldsKoeppe, Thomas January 2010 (has links)
In this thesis we study the moduli of holomorphic vector bundles over a non-compact complex space X, which will mainly be of dimension 2 or 3 and which contains a distinguished rational curve ℓ ⊂ X. We will consider the situation in which X is the total space of a holomorphic vector bundle on CP1 and ℓ is the zero section. While the treatment of the problem in this full generality requires the study of complex analytic spaces, it soon turns out that a large part of it reduces to algebraic geometry. In particular, we prove that in certain cases holomorphic vector bundles on X are algebraic. A key ingredient in the description of themoduli are numerical invariants that we associate to each holomorphic vector bundle. Moreover, these invariants provide a local version of the second Chern class. We obtain sharp bounds and existence results for these numbers. Furthermore, we find a new stability condition which is expressed in terms of these numbers and show that the space of stable bundles forms a smooth, quasi-projective variety.
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Holomorphic vector bundles on compact Riemann surfacesWong, Chiu-fai. January 2000 (has links)
Thesis (M. Phil.)--University of Hong Kong, 2001. / Includes bibliographical references (leaves 116-117).
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Birational equivalence of Higgs moduli /Mehta, Mridul. January 2003 (has links)
Thesis (Ph. D.)--University of Chicago, Dept. of Mathematics, August 2003. / Includes bibliographical references. Also available on the Internet.
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