Further Advances in Twistor Theory, Volume III: Curved Twistor Spaces,9781584880479

Further Advances in Twistor Theory, Volume III: Curved Twistor Spaces

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ISBN13: 9781584880479
ISBN10: 1584880473
Format: Nonspecific Binding
Pub. Date: 2001-03-15
Publisher(s): Chapman & Hall/
List Price: $185.00

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Summary

Although twistor theory originated as an approach to the unification of quantum theory and general relativity, twistor correspondences and their generalizations have provided powerful mathematical tools for studying problems in differential geometry, nonlinear equations, and representation theory. At the same time, the theory continues to offer promising new insights into the nature of quantum theory and gravitation.Further Advances in Twistor Theory, Volume III: Curved Twistor Spaces is actually the fourth in a series of books compiling articles from Twistor Newsletter-a somewhat informal journal published periodically by the Oxford research group of Roger Penrose. Motivated both by questions in differential geometry and by the quest to find a twistor correspondence for general Ricci-flat space times, this volume explores deformed twistor spaces and their applications.Articles from the world's leading researchers in this field-including Roger Penrose-have been written in an informal, easy-to-read style and arranged in four chapters, each supplemented by a detailed introduction. Collectively, they trace the development of the twistor programme over the last 20 years and provide an overview of its recent advances and current status.

Table of Contents

The nonlinear graviton and related constructions
The Nonlinear Graviton and Related Constructions
1(8)
L.J. Mason
The Good Cut Equation Revisited
9(5)
K.P. Tod
Sparling-Tod Metric = Eguchi-Hanson
14(3)
G. Burnett-Stuart
The Wave Equation Transfigured
17(3)
C.R. LeBrun
Conformal Killing Vectors and Reduced Twistor Spaces
20(5)
P.E. Jones
An Alternative Interpretation of Some Nonlinear Gravitons
25(4)
P.E. Jones
H-Space from a Different Direction
29(2)
C.N. Kozameh
E.T. Newman
Complex Quaternionic Kahler Manifolds
31(3)
M.G. Eastwood
A.L.E. Gravitational Instantons and the Icosahedron
34(2)
P.B. Kronheimer
The Einstein Bundle of a Nonlinear Graviton
36(3)
M.G. Eastwood
Examples of Anti-Self-Dual Metrics
39(6)
C.R. LeBrun
Some Quaternionically Equivalent Einstein Metrics
45(3)
A.F. Swann
On the Topology of Quaternionic Manifolds
48(2)
C.R. LeBrun
Homogeneity of Twistor Spaces
50(3)
A.F. Swann
The Topology of Anti-Self-Dual 4-Manifolds
53(6)
C.R. LeBrun
Metrics with S.D. Weyl Tensor from Painleve- VI
59(4)
K.P. Tod
Indefinite Conformally-A. S. D. Metrics on S2 X S2
63(3)
K.P. Tod
Cohomology of a Quaternionic Complex
66(6)
R. Horan
Conformally Invariant Differential Operators on Spin Bundles
72(3)
M.G. Eastwood
A Twistorial Construction of (1,1)-Geodesic Maps
75(6)
P.Z. Kobak
Exceptional Hyper-Kahler Reductions
81(4)
P.Z. Kobak
A.F. Swann
A Nonlinear Graviton from the Sine-Gordon Equation
85(3)
M. Dunajski
A Recursion Operator for A.S.D. Vacuums and ZRM Fields on A.S.D. Backgrounds
88(9)
M. Dunajski
L.J. Mason
Spaces of Complex null geodesics
Introduction to Spaces of Complex Null Geodesics
97(5)
L.J. Mason
Null Geodesics and Conformal Structures
102(6)
C.R. LeBrun
Complex Null Geodesics in Dimension Three
108(3)
C.R. LeBrun
Null Geodesics and Conformal Structures
111(1)
C.R. LeBrun
Heaven with a Cosmological Constant
112(1)
C.R. LeBrun
Some Remarks on Non-Abelian Sheaf Cohomology
113(2)
M.G. Eastwood
Superstructure versus Formal Neighbourhoods
115(2)
M.G. Eastwood
Formal Thickenings of Ambitwistors for Curved Space-Time
117(6)
M.G. Eastwood
Deformations of Ambitwistor Space
123(4)
L.J. Mason
Ambitwistors and Yang-Mills Fields in Self-Dual Space-Times
127(3)
C.R. LeBrun
Superambitwistors
130(2)
M.G. Eastwood
Formal Neighbourhoods, Supermanifolds and Relativised Algebras
132(6)
R.J. Baston
Quaternionic Geometry and the Future Tube
138(2)
C.R. LeBrun
Deformation of Ambitwistor Space and Vanishing Bach Tensors
140(2)
R.J. Baston
L.J. Mason
Formal Neighbourhoods for Curved Ambitwistors
142(8)
R.J. Baston
L.J. Mason
Towards an Ambitwistor Description of Gravity
150(9)
J. Isenberg
P. Yasskin
Hypersurface twistors and Cauchy-Riemann manifolds
Introduction to Hypersurface Twistors and Cauchy-Riemann Structures
159(4)
L. Mason
A Review of Hypersurface Twistors
163(3)
R.S. Ward
Twistor CR Manifolds
166(4)
C.R. LeBrun
Twistor CR Structures and Initial Data
170(3)
C.R. LeBrun
Visualizing Twistor CR Structures
173(2)
C.R. LeBrun
The Twistor Theory of Hypersurfaces in Space-Time
175(4)
G.A.J. Sparling
Twistor, Spinors and the Einstein Vacuum Equations
179(8)
G.A.J. Sparling
Einstein Vacuum Equations
187(5)
G.A.J. Sparling
On Bryant's Condition for Holomorphic Curves in CR-Spaces
192(2)
R. Penrose
The Hill-Penrose-Sparling C.R.-Folds
194(1)
M.G. Eastwood
The Structure and Evolution of Hypersurface Twistor Spaces
195(7)
L.J. Mason
The Chern-Moser Connection for Hypersurface Twistor CR Manifolds
202(7)
L.J. Mason
The Constraint and Evolution Equations for Hypersurface CR Manifolds
209(2)
L.J. Mason
A Characterization of Twistor CR Manifolds
211(4)
L.J. Mason
The Kahler Structure on Asymptotic Twistor Space
215(1)
L. Mason
Twistor CR manifolds for Algebraically Special Space-Times
216(6)
L.J. Mason
Causal Relations and Linking in Twistor Space
222(2)
R. Low
Hypersurface Twistors
224(6)
L.J. Mason
A Twistorial Approach to the Full Vacuum Equations
230(7)
L.J. Mason
R. Penrose
A Note on Causal Relations and Twistor Space
237(2)
R. Low
Towards a twistor description of general space-times
Towards a Twistor Description of General Space-Times; Introductory Comments
239(17)
R. Penrose
Remarks on the Sparling and Eguchi-Hanson (Googly?) GravitionsR. Penrose
256(8)
A New Angle on the Googly Graviton
264(6)
R. Penrose
Concerning a Fourier Contour Integral
270(1)
R. Penrose
The Googly Maps for the Eguchi-Hanson/Sparling-Tod Graviton
271(3)
P.R. Law
Physical Left-Right Symmetry and Googlies
274(6)
R. Penrose
On the Geometry of Googly Maps
280(3)
R. Penrose
P.R. Law
A Prosaic Approach to Googlies
283(3)
A. Helfer
More on Googlies
286(3)
A. Helfer
A Note on Sparling's 3-Form
289(1)
R. Penrose
Remarks on Curved-Space Twistor Theory and Googlies
290(3)
R. Penrose
Relative Cohomology, Googlies and Deformations of II
293(2)
R. Penrose
Is the Plebanski Viewpoint Relevant to the Googly Problem?
295(8)
G. Burnett-Stuart
Note on the Geometry of the Googly Mappings
303(1)
P.R. Law
Exponentiating a Relative H2
304(2)
R. Penrose
The Complex Structure of Deformed Twistor Space
306(4)
P.R. Law
Local Twistor Transport at I+ : An Approach to the Googly
310(7)
R. Penrose
An Approach to a Coordinate Free Calculus at I
317(2)
R. Penrose
V. Thomas
Twistor Theory for Vacuum Space-Time: A New Approach
319(5)
R. Penrose
Twistors as Charges for Spin 3/2 in Vacuum
324(6)
R. Penrose
Light Cone Cuts and Yang-Mills Holonomies: a New Approach
330(8)
L.J. Manson
Twistor as Spin 3/2 Charges Continued: SL(3, C) Bundles
338(7)
R. Penrose
The Most General (2,2) Self-Dual Vacuum: A Googly Approach
345(4)
L. Haslehurst
R. Penrose
A Comment on the Preceding Article
349(4)
N.M.J. Woodhouse
Spin 3/2 Fields and Local Twistors
353(7)
L.J. Mason
R. Penrose
Another View of the Spin 3/2 Equation
360(3)
Jorg Frauendiener
The Bach Equations as an Exact Set of Spinor Fields
363(4)
Jorg Frauendiener
A Novel Approach to Quantum Gravity
367(3)
L.P. Hughston
Twistor and the Time-Irreversibility of State-Vector Reduction
370(2)
R. Penrose
Twistors and State-Vector Reduction
372(3)
R. Penrose
Bibliography 375(28)
Index 403

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