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Submitted for publication in Math. Zeitschrift Manuscript no. (will be inserted by hand later) Two vanishing theorems for holomorphic vector bundles of mixed sign Thierry BOUCHE Universite de Grenoble I, Institut Fourier, BP 74 F-38402 Saint-Martin d'Heres Cedex Fax: (33) 76.51.44.78 e-mail: Received , accepted Summary. We give (tiny) generalizations of vanishing theorems of Kodaira and Kobayashi for vector bundles over compact complex manifolds. Both yield cohomology vanishing for some vector bundles of mixed sign curvature. Their proof relies on heat kernel estimates. Keywords. Vanishing theorems – heat kernel – holomorphic vector bundle – semi-positive curvature – mixed sign curvature Introduction Let X be a compact complex analytic manifold of dimension n endowed with a hermitian metric ?, and L be a holomorphic hermitian line bundle over X. We denote by ic(L) the curvature form of L, and by ?1(x) ≤ . . . ≤ ?n(x) its (ordered) eigenvalues with respect to ? at a given point x of X. The ?j 's are continuous functions on X, but they need not to be C∞. The first aim of this note is to prove the following theorem generalizing the Kodaira (coarse) vanishing theorem : Theorem 1 For some q = 1, .

positive curvature

vector bundles

compact complex

holomorphic vector bundle

vanishing theorems

forms over

semi-positive curvature

forms

Sujets

Université Grenoble-I

Bouche

Constant curvature

Vector bundle

Holomorphic vector bundle

Informations

Publié par	pefav
Nombre de lectures	29
Langue	English

Extrait

Submitted for publication inMath. Zeitschrift Manuscript no.(will be inserted by hand later)

Two vanishing theorems for holomorphic vector bundles of mixed sign

Thierry BOUCHE Universite´deGrenobleI,InstitutFourier,BP74F-38402Saint-Martind’H`eresCedex Fax: (33) 76.51.44.78 e-mail: bouche@fourier.grenet.fr

Received

, accepted

Summary.We give (tiny) generalizations of vanishing theorems of Kodaira and Kobayashi for vector bundles over compact complex manifolds. Both yield cohomology vanishing for some vector bundles of mixed sign curvature. Their proof relies on heat kernel estimates.

Keywords.Vanishing theorems – heat kernel – holomorphic vector bundle – semi-positive curvature – mixed sign curvature

Introduction

LetXbe a compact complex analytic manifold of dimensionnendowed with a hermitian metricω, andLbe a holomorphic hermitian line bundle overX. We denote by ic(L) the curvature form ofL, and byα1(x)≤. . .≤αn(x) its (ordered) eigenvalues with respect toωat a given pointxofX. Theαj’s ∞ are continuous functions onX, but they need not to beC. The ﬁrst aim of this note is to prove the following theorem generalizing the Kodaira (coarse) vanishing theorem : Theorem 1For someq= 1, . . . , n, we suppose thatLhas at leastn−q+ 1 −6n nonnegative eigenvalues and moreover that the functionαis integrable over q X. Then, for any holomorphic vector bundleEoverX, and for anyi≥qthe following vanishing i k H(X, E⊗L) = 0 holds as soon askis suﬃciently large. An easy consequence is the following Corollary 1lha¨amreKanOthahtucbenuldsetivilenisemi-posnifold,a R −6n α <+∞is ample. X1