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

First Page		Document Content
Date: 2018-07-25 13:17:42 Mathematical analysis Mathematics Topology Complex manifolds Vector bundles Algebraic geometry Holomorphic vector bundle Khler manifold Plurisubharmonic function Complex analysis Bo Berndtsson Harmonic function		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 Add to Reading List Source URL: eta.impa.br Download Document from Source Website File Size: 441,74 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