On the number and boundedness of log minimal models of general type

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Autorschaft

  • Diletta Martinelli
  • Stefan Schreieder
  • Luca Tasin

Organisationseinheiten

Externe Organisationen

  • Universiteit van Amsterdam (UvA)
  • Università degli Studi di Milano-Bicocca (UNIMIB)
Forschungs-netzwerk anzeigen

Details

OriginalspracheEnglisch
Seiten (von - bis)1183-1207
Seitenumfang25
FachzeitschriftAnnales Scientifiques de l'Ecole Normale Superieure
Jahrgang53
Ausgabenummer5
PublikationsstatusVeröffentlicht - 2020

Abstract

We show that the number of marked minimal models of an n-dimensional smooth complex projective variety of general type can be bounded in terms of its volume, and, if n=3, also in terms of its Betti numbers. For an n-dimensional projective klt pair (X,D) with \(K_X+D\) big, we show more generally that the number of its weak log canonical models can be bounded in terms of the coefficients of D and the volume of \(K_X+D\). We further show that all n-dimensional projective klt pairs (X,D), such that \(K_X+D\) is big and nef of fixed volume and such that the coefficients of D are contained in a given DCC set, form a bounded family. It follows that in any dimension, minimal models of general type and bounded volume form a bounded family.

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On the number and boundedness of log minimal models of general type. / Martinelli, Diletta; Schreieder, Stefan; Tasin, Luca.
in: Annales Scientifiques de l'Ecole Normale Superieure, Jahrgang 53, Nr. 5, 2020, S. 1183-1207.

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Martinelli D, Schreieder S, Tasin L. On the number and boundedness of log minimal models of general type. Annales Scientifiques de l'Ecole Normale Superieure. 2020;53(5):1183-1207. doi: 10.24033/ASENS.2443
Martinelli, Diletta ; Schreieder, Stefan ; Tasin, Luca. / On the number and boundedness of log minimal models of general type. in: Annales Scientifiques de l'Ecole Normale Superieure. 2020 ; Jahrgang 53, Nr. 5. S. 1183-1207.
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abstract = "We show that the number of marked minimal models of an n-dimensional smooth complex projective variety of general type can be bounded in terms of its volume, and, if n=3, also in terms of its Betti numbers. For an n-dimensional projective klt pair (X,D) with \(K_X+D\) big, we show more generally that the number of its weak log canonical models can be bounded in terms of the coefficients of D and the volume of \(K_X+D\). We further show that all n-dimensional projective klt pairs (X,D), such that \(K_X+D\) is big and nef of fixed volume and such that the coefficients of D are contained in a given DCC set, form a bounded family. It follows that in any dimension, minimal models of general type and bounded volume form a bounded family. ",
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AU - Martinelli, Diletta

AU - Schreieder, Stefan

AU - Tasin, Luca

N1 - Funding Information: Parts of the results of this article were conceived when the third author was supported by the DFG Emmy Noether-Nachwuchsgruppe “Gute Strukturen in der höherdimensionalen birationalen Geometrie”. The second author is member of the SFB/TR 45 and thanks the Università Roma Tre for hospitality, where parts of this project were carried out.

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AB - We show that the number of marked minimal models of an n-dimensional smooth complex projective variety of general type can be bounded in terms of its volume, and, if n=3, also in terms of its Betti numbers. For an n-dimensional projective klt pair (X,D) with \(K_X+D\) big, we show more generally that the number of its weak log canonical models can be bounded in terms of the coefficients of D and the volume of \(K_X+D\). We further show that all n-dimensional projective klt pairs (X,D), such that \(K_X+D\) is big and nef of fixed volume and such that the coefficients of D are contained in a given DCC set, form a bounded family. It follows that in any dimension, minimal models of general type and bounded volume form a bounded family.

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KW - minimal model program

KW - boundedness results

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