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Stability and applications to birational and hyperkaehler geometry - Lecture 1

Apparaît dans la collection : Exposés de recherche

This lecture series will be an introduction to stability conditions on derived categories, wall-crossing, and its applications to birational geometry of moduli spaces of sheaves. I will assume a passing familiarity with derived categories.

Introduction to stability conditions. I will start with a gentle review of aspects of derived categories. Then an informal introduction to Bridgeland’s notion of stability conditions on derived categories [2, 5, 6]. I will then proceed to explain the concept of wall-crossing, both in theory, and in examples [1, 2, 4, 6].
Wall-crossing and birational geometry. Every moduli space of Bridgeland-stable objects comes equipped with a canonically defined nef line bundle. This systematically explains the connection between wall-crossing and birational geometry of moduli spaces. I will explain and illustrate the underlying construction [7].
Applications : Moduli spaces of sheaves on $K3$ surfaces. I will explain how one can use the theory explained in the previous talk in order to systematically study the birational geometry of moduli spaces of sheaves, focussing on $K3$ surfaces [1, 8].

Informations sur la vidéo

Date de captation 24/11/2015
Date de publication 05/01/2016
Institut CIRM
Licence CC BY NC ND
Langue Anglais
Réalisateur(s) Guillaume Hennenfent
Format MP4

Données de citation

DOI 10.24350/CIRM.V.18897603
Citer cette vidéo Bayer, Arend (24/11/2015). Stability and applications to birational and hyperkaehler geometry - Lecture 1. CIRM. Audiovisual resource. DOI: 10.24350/CIRM.V.18897603
URL https://dx.doi.org/10.24350/CIRM.V.18897603

Domaine(s)

Géométrie algébrique

Bibliographie

[1] Arcara, D., Bertram, A., Coskun, I., Huizenga, J. (2013). The minimal model program for the Hilbert scheme of points on $\mathbb{P}2$ and Bridgeland stability. Advances in Mathematics, 235, 580-626. < arXiv:1203.0316> - http://arxiv.org/abs/1203.0316
[2] Bridgeland, T. (2007). Stability condition on triangulated categories. Annals of Mathematics. Second Series, 166(2), 317-345. <arXiv:math/0212237> - http://arxiv.org/abs/math/0212237
[3] Bridgeland, T. (2009). Spaces of stability conditions. In D. Abramovich, A. Bertram, L. Katzarkov, R. Pandharipande, & M. Thaddeus (Eds.), Algebraic geometry: Seattle 2005 (pp. 1-21). Providence, RI: American Mathematical Society. (Proceedings of Symposia in Pure Mathematics 80.1). <arXiv:math/0611510> - http://arxiv.org/abs/math/0611510
[4] Bridgeland, T. (2008). Stability conditions on $K3$ surfaces. Duke Mathematical Journal, 141(2), 241-291. <arXiv:math/0307164> - http://arxiv.org/abs/math/0307164
[5] Caldararu, A. (2005). Derived categories of sheaves : a skimming. In R. Vakil (Ed.), Snowbird lectures in algebraic geometry (pp. 43-75). Providence, RI: American Mathematical Society. (Contemporary Mathematics, 388). <arXiv:math/0501094> - http://arxiv.org/abs/math/0501094
[6] Bayer, A. ”A tour to stability conditions on derived categories”, Informal notes available on my homepage - http://www.maths.ed.ac.uk/~abayer/dc-lecture-notes.pdf
[7] Bayer, A., & Macri, E. (2014). Projectivity and birational geometry of Bridgeland moduli spaces. Journal of the American Mathematical Society, 27(3), 707-752. <arXiv:1203.4613> - http://arxiv.org/abs/1203.4613
[8] Bayer, A., & Macri, E. (2014). MMP for moduli of sheaves on $K3$s via wall-crossing : nef and movable cones, Lagrangian fibrations. Inventiones Mathematicae, 198(3), 505-590. <arXiv:1301.6968> - http://arxiv.org/abs/1301.6968

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