The Calabi Problem for Fano Threefolds

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Carolina Araujo (Instituto Nacional de Matemática Pura e Aplicada (IMPA), Rio de Janeiro) Ana-Maria Castravet (Université Versailles/Saint Quentin-en-Yvelines)

The Calabi Problem for Fano Threefolds

Carolina Araujo (Instituto Nacional de Matemática Pura e Aplicada (IMPA), Rio de Janeiro), Ana-Maria Castravet (Université Versailles/Saint Quentin-en-Yvelines), Ivan Cheltsov (University of Edinburgh) , Kento Fujita (Osaka University, Japan)

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English

Cambridge University Press
29 June 2023

Algebra; Algebraic geometry

Series: London Mathematical Society Lecture Note Series

Algebraic varieties are shapes defined by polynomial equations. Smooth Fano threefolds are a fundamental subclass that can be thought of as higher-dimensional generalizations of ordinary spheres. They belong to 105 irreducible deformation families. This book determines whether the general element of each family admits a Kähler–Einstein metric (and for many families, for all elements), addressing a question going back to Calabi 70 years ago. The book's solution exploits the relation between these metrics and the algebraic notion of K-stability. Moreover, the book presents many different techniques to prove the existence of a Kähler–Einstein metric, containing many additional relevant results such as the classification of all Kähler–Einstein smooth Fano threefolds with infinite automorphism groups and computations of delta-invariants of all smooth del Pezzo surfaces. This book will be essential reading for researchers and graduate students working on algebraic geometry and complex geometry.

By: Carolina Araujo (Instituto Nacional de Matemática Pura e Aplicada (IMPA) Rio de Janeiro), Ana-Maria Castravet (Université Versailles/Saint Quentin-en-Yvelines), Ivan Cheltsov (University of Edinburgh), Kento Fujita (Osaka University, Japan), Anne-Sophie Kaloghiros (Brunel University)
Imprint: Cambridge University Press
Country of Publication: United Kingdom
Dimensions: Height: 229mm, Width: 152mm, Spine: 25mm
Weight: 660g
ISBN: 9781009193399
ISBN 10: 1009193392
Series: London Mathematical Society Lecture Note Series
Pages: 455
Publication Date: 29 June 2023
Audience: College/higher education , Further / Higher Education
Format: Paperback
Publisher's Status: Active

Carolina Araujo is a researcher at the Institute for Pure and Applied Mathematics (IMPA), Rio de Janeiro, Brazil. Ana-Maria Castravet is Professor at the University of Versailles, France. Ivan Cheltsov is Chair of Birational Geometry at the University of Edinburgh. Kento Fujita is Associate Professor at Osaka University. Anne-Sophie Kaloghiros is a Reader at Brunel University London. Jesus Martinez-Garcia is Senior Lecturer in Pure Mathematics at the University of Essex. Constantin Shramov is a researcher at the Steklov Mathematical Institute, Moscow. Hendrik Süß is Chair of Algebra at the University of Jena, Germany. Nivedita Viswanathan is a Research Associate at Loughborough University.

Reviews for The Calabi Problem for Fano Threefolds

'The notion of K-stability for Fano manifold has origins in differential geometry and geometric analysis but is now also of fundamental importance in algebraic geometry, with recent developments in moduli theory. This monograph gives an account of a large body of research results from the last decade, studying in depth the case of Fano threefolds. The wealth of material combines in a most attractive way sophisticated modern theory and the detailed study of examples, with a classical flavour. The authors obtain complete results on the K-stability of generic elements of each of the 105 deformation classes. The concluding chapter contains some fascinating conjectures about the 34 families which may contain both stable and unstable manifolds, which will surely be the scene for much further work. The book will be an essential reference for many years to come.' Sir Simon Donaldson, F.R.S., Imperial College London