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Analysis on Kähler and Lorentzian manifolds

Authors :
Nicolas Ginoux
Ginoux, Nicolas
Universität Regensburg (UR)
Assistant position at Universität Regensburg
Universität Regensburg
Bernd Ammann
Source :
HAL, Differential Geometry [math.DG]. Universität Regensburg, 2013

Abstract

This habilitation thesis deals with the interactions between geometry of and analysis on smooth manifolds in different situations. Chapter 1 summarises all the results obtained in the next chapters. Chapter 2 deals with the spectrum of the Dirac operator of the Berger metrics on a 3-dimensional space. Estimates on the smallest eigenvalues of twisted Dirac operators on the complex projective space are computed and their limiting-case discussed in chapter 3. Chapter 4 focuses on a purely geometric question of classifying those Kähler spin manifolds with imaginary Kählerian Killing spinors. In chapter 5, we address the Yamabe problem on globally hyperbolic spacetimes. Chapter 6 is concerned with locally covariant quantization of fields for a large class of differential operators on spacetimes.

Details

Database :
OpenAIRE
Journal :
HAL, Differential Geometry [math.DG]. Universität Regensburg, 2013
Accession number :
edsair.dedup.wf.001..87dc3529d6b67c75ec8c3bf2575b6109