Calabi-Yau Varieties: Arithmetic, Geometry and Physics

This volume presents a lively introduction to the rapidly developing and vast research areas surrounding CalabiYau varieties and string theory. With its coverage of the various perspectives of a wide area of topics such as Hodge theory, GrossSiebert program, moduli problems, toric approach, and arithmetic aspects, the book gives a comprehensive overview of the current streams of mathematical research in the area.

The contributions in this book are based on lectures that took place during workshops with the following thematic titles: Modular Forms Around String Theory, Enumerative Geometry and CalabiYau Varieties, Physics Around Mirror Symmetry, Hodge Theory in String Theory. The book is ideal for graduate students and researchers learning about CalabiYau varieties as well as physics students and string theorists who wish to learn the mathematics behind these varieties.

Fills a gap in the existing literature, presenting a friendly yet comprehensive introduction of the subject matter Covers diverse streams of current research Provides quick exposure to rapidly developing subjects

Auteur
Matthias Schütt, geboren 1955, Journalist, ist nach über 20-jähriger Tätigkeit als leitender Redakteur seit 2008 freiberuflich tätig.

Contenu
The Geometry and Moduli of K3 Surfaces (A. Harder, A. Thompson).- Picard Ranks of K3 Surfaces of BHK Type (T. Kelly).- Reflexive Polytopes and Lattice-Polarized K3 Surfaces (U. Whitcher).- An Introduction to Hodge Theory (S.A. Filippini, H. Ruddat, A. Thompson).- Introduction to Nonabelian Hodge Theory (A. Garcia-Raboso, S. Rayan).- Algebraic and Arithmetic Properties of Period Maps (M. Kerr).- Mirror Symmetry in Physics (C. Quigley).- Introduction to GromovWitten Theory (S. Rose).- Introduction to DonaldsonThomas and Stable Pair Invariants (M. van Garrel).- DonaldsonThomas Invariants and Wall-Crossing Formulas (Y. Zhu).- Enumerative Aspects of the GrossSiebert Program (M. van Garrel, D.P. Overholser, H. Ruddat).- Introduction to Modular Forms (S. Rose).- Lectures on Holomorphic Anomaly Equations (A. Kanazawa, J. Zhou).- Polynomial Structure of Topological Partition Functions (J. Zhou).- Introduction to Arithmetic Mirror Symmetry (A. Perunicic).