Read Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (Am-121), Volume 121

Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (Am-121), Volume 121

Victor W. Guillemin

4.9/5 (22299 ratings)

Description:The subject matter of this work is an area of Lorentzian geometry which has not been heretofore much investigated: Do there exist Lorentzian manifolds all of whose light-like geodesics are periodic? A surprising fact is that such manifolds exist in abundance in (2 + 1)-dimensions (though in higher dimensions they are quite rare). This book is concerned with the deformation theory of M2,1 (which furnishes almost all the known examples of these objects). It also has a section describing conformal invariants of these objects, the most interesting being the determinant of a two dimensional "Floquet operator," invented by Paneitz and Segal.We have made it easy for you to find a PDF Ebooks without any digging. And by having access to our ebooks online or by storing it on your computer, you have convenient answers with Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (Am-121), Volume 121. To get started finding Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (Am-121), Volume 121, you are right to find our website which has a comprehensive collection of manuals listed.
Our library is the biggest of these that have literally hundreds of thousands of different products represented.

Pages: —

Format: PDF, EPUB & Kindle Edition

Publisher: —

Release: —

ISBN: 1400882419

Description: The subject matter of this work is an area of Lorentzian geometry which has not been heretofore much investigated: Do there exist Lorentzian manifolds all of whose light-like geodesics are periodic? A surprising fact is that such manifolds exist in abundance in (2 + 1)-dimensions (though in higher dimensions they are quite rare). This book is concerned with the deformation theory of M2,1 (which furnishes almost all the known examples of these objects). It also has a section describing conformal invariants of these objects, the most interesting being the determinant of a two dimensional "Floquet operator," invented by Paneitz and Segal.We have made it easy for you to find a PDF Ebooks without any digging. And by having access to our ebooks online or by storing it on your computer, you have convenient answers with Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (Am-121), Volume 121. To get started finding Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (Am-121), Volume 121, you are right to find our website which has a comprehensive collection of manuals listed.
Our library is the biggest of these that have literally hundreds of thousands of different products represented.

Special Offer | $0.00

Special Offer! | $0.00

Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (Am-121), Volume 121

Cosmology in (2 + 1) -Dimensions, Cyclic Models, and Deformations of M2,1. (Am-121), Volume 121

More Books

Supersymmetry and Equivariant de Rham Theory

Supersymmetry and Equivariant de Rham Theory

Variations on a Theme by Kepler (COLLOQUIUM PUBLICATIONS (AMER MATHEMATICAL SOC))

Variations on a Theme by Kepler (COLLOQUIUM PUBLICATIONS (AMER MATHEMATICAL SOC))

Differential Topology

Differential Topology

Supersymmetry and Equivariant de Rham Theory by Victor W Guillemin (2010-02-19)

Supersymmetry and Equivariant de Rham Theory by Victor W Guillemin (2010-02-19)

The Story of Quantum Mechanics

The Story of Quantum Mechanics

Symplectic Techniques in Physics

Symplectic Techniques in Physics

Geometric Asymptotics (Mathematical Surveys and Monographs Number 14)

Geometric Asymptotics (Mathematical Surveys and Monographs Number 14)

Moment Maps, Cobordisms, and Hamiltonian Group Actions (Mathematical Surveys and Monographys, Vol. 98)

Moment Maps, Cobordisms, and Hamiltonian Group Actions (Mathematical Surveys and Monographys, Vol. 98)

Symplectic Fibrations and Multiplicity Diagrams

Symplectic Fibrations and Multiplicity Diagrams