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Some boundedness results for Fano-like Moishezon manifolds.

Bonavero, Laurent; Takayama, Shigeharu — 2000

Documenta Mathematica

Factorisation faible des applications birationnelles

Laurent Bonavero

Séminaire Bourbaki

Sur des variétés toriques non projectives

Laurent Bonavero — 2000

Bulletin de la Société Mathématique de France

Sur des variétés de Moishezon dont le groupe de Picard est de rang un

Laurent Bonavero — 1996

Bulletin de la Société Mathématique de France

Quasi-lines and their degenerations

Laurent Bonavero; Andreas Höring — 2007

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

In this paper we study the structure of manifolds that contain a quasi-line and give some evidence towards the fact that the irreducible components of degenerations of the quasi-line should determine the Mori cone. We show that the minimality with respect to a quasi-line yields strong restrictions on fibre space structures of the manifold.

On covering and quasi-unsplit families of curves

Laurent Bonavero; Cinzia Casagrande; Stéphane Druel — 2007

Journal of the European Mathematical Society

Given a covering family $V$ of effective 1-cycles on a complex projective variety $X$ , we find conditions allowing one to construct a geometric quotient $q : X \to Y$ , with $q$ regular on the whole of $X$ , such that every fiber of $q$ is an equivalence class for the equivalence relation naturally defined by $V$ . Among other results, we show that on a normal and $ℚ$ -factorial projective variety $X$ with canonical singularities and $dim X \leq 4$ , every covering and quasi-unsplit family $V$ of rational curves generates a geometric extremal...

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