Detailed Information on Publication Record
2018
Axisymmetric black holes allowing for separation of variables in the Klein-Gordon and Hamilton-Jacobi equations
KONOPLYA, Roman, Zdeněk STUCHLÍK and Olexandr ZHYDENKOBasic information
Original name
Axisymmetric black holes allowing for separation of variables in the Klein-Gordon and Hamilton-Jacobi equations
Authors
KONOPLYA, Roman (804 Ukraine, guarantor, belonging to the institution), Zdeněk STUCHLÍK (203 Czech Republic, belonging to the institution) and Olexandr ZHYDENKO (804 Ukraine, belonging to the institution)
Edition
Physical Review D, 2018, 2470-0010
Other information
Language
English
Type of outcome
Článek v odborném periodiku
Field of Study
10308 Astronomy
Country of publisher
United States of America
Confidentiality degree
není předmětem státního či obchodního tajemství
References:
RIV identification code
RIV/47813059:19240/18:A0000266
Organization unit
Faculty of Philosophy and Science in Opava
UT WoS
000430820500005
Keywords in English
axisymmetric black holes; separation of variables; Hamilton-Jacobi equation; Klein-Gordon equation
Tags
International impact, Reviewed
Links
GB14-37086G, research and development project.
Změněno: 4/4/2019 13:24, RNDr. Jan Hladík, Ph.D.
Abstract
V originále
We determine the class of axisymmetric and asymptotically flat black-hole spacetimes for which the test Klein-Gordon and Hamilton-Jacobi equations allow for the separation of variables. The known Kerr, Kerr-Newman, Kerr-Sen and some other black-hole metrics in various theories of gravity are within the class of spacetimes described here. It is shown that although the black-hole metric in the Einstein-dilaton-Gauss-Bonnet theory does not allow for the separation of variables (at least in the considered coordinates), for a number of applications it can be effectively approximated by a metric within the above class. This gives us some hope that the class of spacetimes described here may be not only generic for the known solutions allowing for the separation of variables, but also a good approximation for a broader class of metrics, which does not admit such separation. Finally, the generic form of the axisymmetric metric is expanded in the radial direction in terms of the continued fractions and the connection with other black-hole parametrizations is discussed.