May 18-22, 2015
Department of Mathematics, Vanderbilt University





30th Shanks Lecturer
Fields Medalist
Shing-Tung Yau
Harvard University







BACKGROUND & SCOPE
Kähler geometry is an area with deep roots and very rapid and diverse advances. Remarkable progress has been made recently in different directions such as the study of Kähler-Einstein metrics on Fano manifolds, complete Calabi-Yau manifolds, as well as extremal Kähler metrics and their link with algebraic-geometric notions of stability on polarized manifolds. The main objective of the conference is to bring together leading experts in the separate but related fields of differential geometry, geometric analysis and algebraic geometry, to present recent results and future directions of research in the field.  

TOPICS
Topics include, but are not limited to, the following areas:
  • Kähler-Einstein metrics
  • Complete Calabi-Yau manifolds with prescribed asymptotic behavior
  • Extremal Kähler metrics
  • Moduli space of Kähler metrics
  • Hermitian manifolds

ABSTRACTS

SCHEDULE

POSTER


SCIENTIFIC COMMITTEE
Paul Gauduchon, École Polytechnique, France
Xiuxiong Chen, Stony Brook University, USA
Claude LeBrun, Stony Brook University, USA
Ioana Suvaina, Vanderbilt University


LOCAL COMMITTEE
John Ratcliffe, Vanderbilt University
Ioana Suvaina, Vanderbilt University
Caner Koca, Vanderbilt University
Rares Rasdeaconu, Vanderbilt University


CONFERENCE COORDINATOR
Katie Kelly, Vanderbilt University


EMAIL UPDATES
If you would like to receive information and updates on Recent Advances in Kähler Geometry by email, please send a message to: kahlergeometry@vanderbilt.edu


SPONSORED BY
Shanks Endowment
Vanderbilt University
National Science Foundation