New Euclidon Method Of Generating Stationary Vacuum Einstein Fields
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A01=Aleksandr A Shaideman
A01=Kirill V Golubnichiy
A01=Tsarai I Gutsunaev
Author_Aleksandr A Shaideman
Author_Kirill V Golubnichiy
Author_Tsarai I Gutsunaev
Category=PHDV
Category=PHR
Chazi-Curzon Solution
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Exact Asymptotically Flat Solutions
Flat Space-Time
Gravitational Capture
Magnetic Dipole Moment
N-Kerr Solution
One-Stationary Euclidon Solution
One-Stationary Zakharov-Belinsky Soliton Solution
Relativistic Accelerated Non-Inertial Reference Frame
Schwarzschild Metric
Stationary Axially Symmetric Vacuum Einstein-Maxwell Equations
Product details
- ISBN 9789819813919
- Publication Date: 11 Aug 2025
- Publisher: World Scientific Publishing Co Pte Ltd
- Publication City/Country: SG
- Product Form: Hardback
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The purpose of this book is to systematically derive, as much as possible, the main exact asymptotically flat solutions of the static and stationary axially symmetric vacuum Einstein-Maxwell equations. The primary "building block" used is the Euclidon solution, which has a clear physical interpretation as a relativistic accelerated non-inertial reference frame in the flat space-time.In the first part, static Einstein fields are considered. The one-static Euclidon solution and its generalizations are obtained by various methods.The second part deals with the main classes of stationary vacuum Einstein field solutions. The one-stationary soliton solution, the one-stationary Euclidon solution, and its physical interpretation are obtained.In the third part, using the method of variation of parameters, solutions are obtained including a two-Euclidon stationary solution, which coincides with the Kerr-NUT solution.The fourth part deals with the main classes of static Einstein-Maxwell fields. The methods of superposition of the one-stationary Euclidon solution, the one-stationary soliton solution, and the two-Euclidon stationary solution with arbitrary external static electrovacuum fields are also applied to this case.The fifth part deals with stationary Einstein-Maxwell fields. The generalized solutions are constructed using symmetry transformations from the previously found solutions.
