1215 Documenta Math. Evidence for a Generalization of Gieseker’s Conjecture on Stratified Bundles

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Date: 2013-10-21 06:49:23 Algebraic geometry Vector bundles Algebraic varieties Sheaf theory RiemannHilbert correspondence Divisor Ample line bundle Functor Sheaf Projective variety Coherent sheaf cohomology Chow group		1215 Documenta Math. Evidence for a Generalization of Gieseker’s Conjecture on Stratified Bundles Add to Reading List Source URL: documenta.sagemath.org Download Document from Source Website File Size: 283,89 KB Share Document on Facebook

	Abstract This is a survey of results on positivity of vector bundles, inspired by the BrunnMinkowski and Prékopa theorems. Applications to complex analysis, Kähler geometry and algebraic geometry are also discussed. Pr DocID: 1xVyz - View Document
	LOCAL RRH THOMAS WILLWACHER Abstract. In [6] Engeli and Felder describe a generalized Riemann-RochHirzebruch formula to compute the Lefschetz numbers of differential operators on holomorphic vector bundles. Essentially, DocID: 1xTGj - View Document
	TRIVIALITY AND SPLIT OF VECTOR BUNDLES ON RATIONALLY CONNECTED VARIETIES XUANYU PAN Abstract. In this paper, we use the existence of a family of rational curves on a separably connected variety, which satisfies the Lefsc DocID: 1tneC - View Document
	619 Documenta Math. Arithmetic Characteristic Classes of Automorphic Vector Bundles DocID: 1sF70 - View Document
	619 Documenta Math. Arithmetic Characteristic Classes of Automorphic Vector Bundles DocID: 1s2j4 - View Document