Fr. 77.00

Mustafa Kalafat

Self-Dual Metrics on 4-Manifolds

English, German · Paperback / Softback

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Description

This an introductory book on Self-Dual Riemannian 4- Manifolds. Self-Dual metrics are special type of metrics which provide solution to the "Optimal Metric" problem. Under a vanishing hypothesis, Donaldson and Friedman proved that the connected sum of two self-dual Riemannian 4-Manifolds is again self-dual. Here we prove that the same result can be extended over to the positive scalar curvature case. The idea is to use Leray spectral sequence. Secondly we give an example of a 4-manifold with b+ = 0 admitting a scalar- at anti-self-dual metric. Finally we present an application of the Geometric Invariant Theory(GIT) for Toric Varieties to the Einstein-Weyl Geometry.

About the author

Mustafa Kalafat received his Ph.D. at Stony Brook University of New York in 2007 under the supervision of Claude LeBrun. He taught at University of Wisconsin at Madison. Now a faculty of the Middle East Technical University at Ankara, Turkia.

Product details

Authors	Mustafa Kalafat
Publisher	LAP Lambert Academic Publishing

Languages	English, German
Product format	Paperback / Softback
Released	29.10.2010

EAN	9783843362016
ISBN	978-3-8433-6201-6
No. of pages	140
Dimensions	150 mm x 220 mm x 8 mm
Weight	203 g
Subject	Natural sciences, medicine, IT, technology > Mathematics > Geometry

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