Positivität relativer kanonischer Bündel und Krümmung höherer direkter Bildgarben auf Familien von Calabi-Yau-Mannigfaltigkeiten
In dieser Arbeit werden geometrische Eigenschaften des Modulraums polarisierter Calabi-Yau-Mannigfaltigkeiten mittels Methoden der komplex-analytischen Differentialgeometrie untersucht. Dazu werden Familien polarisierter Calabi-Yau-Mannigfaltigkeiten betrachtet. Die Fasern einer solchen Familie besi...
Главный автор: | |
---|---|
Другие авторы: | |
Формат: | Dissertation |
Язык: | немецкий |
Опубликовано: |
Philipps-Universität Marburg
2015
|
Предметы: | |
Online-ссылка: | PDF-полный текст |
Метки: |
Добавить метку
Нет меток, Требуется 1-ая метка записи!
|
This thesis deals with geometric properties of the moduli space of polarized Calabi-Yau manifolds employing methods from complex-analytic differential geometry. Given a family of polarized Calabi-Yau manifolds, the fibers possess unique Ricci-flat Kähler metrics with cohomology classes prescribed by the polarization. These Kähler metrics induce a Hermitian metric on the relative canonical bundle of the family, whose curvature form is studied. Moreover, a sufficient condition for the existence of a semi-Ricci-flat Kähler metric on the total space of a family is shown. Furthermore, certain higher direct image sheaves, carrying natural Hermitian metrics which generalize the Weil-Petersson metric on the moduli space, are considered. The curvature tensor of these metrics is calculated and some applications are outlined.