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Andrzej Krasinski
Andrzej Krasinski
Polish Academy of Sciences
Verified email at camk.edu.pl
Title
Cited by
Cited by
Year
Inhomogeneous cosmological models
A Krasinski
Inhomogeneous Cosmological Models, 317, 1997
8411997
An Introduction to General Relativity and Cosmology
J Plebanski, A Krasinski
Cambridge University Press, 2006
4852006
Inhomogeneous cosmological models: exact solutions and their applications
K Bolejko, MN Célérier, A Krasiński
Classical and Quantum Gravity 28 (16), 164002, 2011
2002011
Structures in the Universe by exact methods: formation, evolution, interactions
K Bolejko, A Krasiński, C Hellaby, MN Celerier
Cambridge University Press, 2010
1652010
A (giant) void is not mandatory to explain away dark energy with a Lemaître-Tolman model
MN Célérier, K Bolejko, A Krasiński
Astronomy & Astrophysics 518, A21, 2010
1212010
Ellipsoidal space-times, sources for the Kerr metric
A Krasiński
Annals of Physics 112 (1), 22-40, 1978
951978
You cannot get through Szekeres wormholes: Regularity, topology, and causality in quasispherical Szekeres models
C Hellaby, A Krasiński
Physical Review D 66 (8), 084011, 2002
892002
Structure formation in the Lemaitre-Tolman model
A Krasiński, C Hellaby
Physical Review D 65 (2), 023501, 2001
832001
On the global geometry of the Stephani universe
A Krasiński
General relativity and gravitation 15 (7), 673-689, 1983
821983
Formation of a galaxy with a central black hole in the Lemaitre-Tolman model
A Krasiński, C Hellaby
Physical Review D 69 (4), 043502, 2004
812004
Physics in an inhomogeneous universe
A Krasinski
Inhomogeneous cosmological models. Proceedings of the 1994 Spanish …, 1995
671995
More examples of structure formation in the Lemaitre-Tolman model
A Krasiński, C Hellaby
Physical Review D 69 (2), 023502, 2004
652004
Formation of voids in the Universe within the Lemaître–Tolman model
K Bolejko, A Krasinski, C Hellaby
Monthly Notices of the Royal Astronomical Society 362 (1), 213-228, 2005
602005
Solutions of the Einstein field equations for a rotating perfect fluid. Part 2. Properties of the flow-stationary and vortex-homogeneous solutions
A Krasinski
Acta Phys. Polon. B 6, 223, 1974
551974
“Golden Oldie" editorial: The Bianchi Classification in the Schücking-Behr Approach.
A Krasiński, C Behr, E Schücking, F Estabrook, H Wahlquist, G Ellis, ...
General Relativity & Gravitation 35 (3), 2003
542003
Space-times with spherically symmetric hypersurfaces
A Krasinski
General Relativity and Gravitation 13, 1021-1035, 1981
531981
Redshift propagation equations in the β′≠ 0 Szekeres models
A Krasiński, K Bolejko
Physical Review D 83 (8), 083503, 2011
512011
Solutions of the Einstein field equations for a rotating perfect fluid. Part 1: Presentation of the flow, stationary and vortex-homogeneous solutions
A Krasinski
Acta Physica Polonica B5, 411 (1974) 5 (4), 411, 1974
511974
Physical and geometrical interpretation of the ϵ≤ 0 Szekeres models
C Hellaby, A Krasiński
Physical Review D 77 (2), 023529, 2008
492008
Alternative methods of describing structure formation in the Lemaitre-Tolman model
C Hellaby, A Krasiński
Physical Review D 73 (2), 023518, 2006
492006
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