Journal ArticleDOI
Finite rank vector bundles on inductive limits of grassmannians
Joseph Donin,Ivan Penkov +1 more
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In this paper, the authors extend the Barth-Van de Ven de Ven-Tyurin (BVT) theorem to general sequences of morphisms between projective spaces by proving that, if there are infinitely many morphisms of degree higher than one, every vector bundle of finite rank on the inductive limit is trivial.Abstract:
If P 1 is the projective ind-space, i.e. P 1 is the inductive limit of linear embeddings of complex projective spaces, the Barth-Van de Ven-Tyurin (BVT) Theorem claims that every finite rank vector bundle on P 1 is isomorphic to a direct sum of line bundles. We extend this theorem to general sequences of morphisms between projective spaces by proving that, if there are infinitely many morphisms of degree higher than one, every vector bundle of finite rank on the inductive limit is trivial. We then establish a relative version of these results, and apply it to the study of vector bundles on inductive limits of grassmannians. In particular we show that the BVT Theorem extends to the ind-grassmannian of subspaces commensurable with a fixed infinite dimensional and infinite codimensional subspace in C 1 . We also show that, for a class of twisted ind-grassmannians, every finite rank vector bundle is trivial. 2000 AMS Subject Classification: Primary 32L05, 14J60, Secondary 14M15.read more
Citations
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Journal ArticleDOI
Ind-varieties of generalized flags as homogeneous spaces for classical ind-groups
Ivan Dimitrov,Ivan Penkov +1 more
TL;DR: In this article, the notion of a generalized flag in an infinite-dimensional vector space V was introduced and a geometric realization of homogeneous spaces of the ind-groups SL, SO, and Sp(∞) in terms of generalized flags was given.
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Ind--varieties of generalized flags as homogeneous spaces for classical ind--groups
Ivan Dimitrov,Ivan Penkov +1 more
TL;DR: In this article, the notion of a generalized flag in an infinite dimensional vector space (V$) was introduced and a geometric realization of homogeneous spaces of the ind-groups was given in terms of generalized flags.
Book ChapterDOI
Rank-2 Vector Bundles on ind-Grassmannians
TL;DR: In this article, the authors give a complete description of finite-rank vector bundles on any linear ind-Grassmannian, and prove that any vector bundle of rank 2 on a twisted ind-grasmannian is trivial.
Journal ArticleDOI
Locally free sheaves on complex supermanifolds
TL;DR: In this article, it was shown that the Birkhoff-Grothendieck Theorem does not hold true for projective superspaces, and a spectral sequence which connects the cohomology with values in a locally free sheaf with a given retract gr was constructed.
Journal ArticleDOI
Triviality of vector bundles on twisted ind-Grassmannians
TL;DR: In this article, it was shown that any vector bundle of finite rank on a twisted ind-Grassmannian is trivial, and it has been shown that this conjecture is true for all vector bundles.
References
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Journal ArticleDOI
A Bott-Borel-Weil theory for direct limits of algebraic groups
TL;DR: In this article, a Bott-Borel-Weil theory for direct limits of algebraic groups was developed for root-reductive ind-groups, i.e., groups whose Lie algebras admit root decomposition.
Journal ArticleDOI
On the decomposability of infinitely extendable vector bundles on projective spaces and Grassmann varieties
Journal ArticleDOI
Ind-varieties of generalized flags as homogeneous spaces for classical ind-groups
Ivan Dimitrov,Ivan Penkov +1 more
TL;DR: In this article, the notion of a generalized flag in an infinite-dimensional vector space V was introduced and a geometric realization of homogeneous spaces of the ind-groups SL, SO, and Sp(∞) in terms of generalized flags was given.