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Borel actions of Polish groups

Author(s): Howard Becker; Alexander S. Kechris
Journal: Bull. Amer. Math. Soc. 28 (1993), 334-341.
MSC (1991): Primary 03E15, 28D15
MathSciNet review: 1185149
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References:

[AM]
L. Auslander and C. C. Moore, \emph{Unitary representations of solvable Lie groups} vol.~62, Amer. Math. Soc., Providence, RI, 1966. MR 207910
[Be]
H. Becker, The topological Vaught's conjecture and minimal counterexamples, J. Symbolic Logic. MR
[Bu]
J. P. Burgess, Equivalences generated by families of Borel sets, Proc. Amer. Math. Soc. \textbf{69} (1978), 323--326. MR 476524
[BM]
J. P. Burgess and D. E. Miller, Remarks on invariant descriptive set theory, Fund. Math. \textbf{90} (1975), 53--75. MR 403975
[C]
G. Choquet, Lectures on analysis, W. A. Benjamin, New York, 1969. MR
[E]
E. G. Effros, Transformation groups and $C^*$-algebras, Ann. of Math. (2) \textbf{81} (1965), 38--55. MR 174987
[FHM]
J. Feldman, P. Hahn, and C. C. Moore, Orbit structure and countable sections for actions of continuous groups, Adv. in Math. \textbf{28} (1978), 186--230. MR 492061
[G]
J. Glimm, Locally compact transformation groups, Trans. Amer. Math. Soc. \textbf{101} (1961), 124--138. MR 136681
[HKL]
L. Harrington, A. S. Kechris, and A. Louveau, A Glimm-Effros dichotomy for Borel equivalence relations, J. Amer. Math. Soc. \textbf{3} (1990), 903--928. MR 1057041
[K]
A. S. Kechris, Countable sections for locally compact group actions, Ergodic Theory Dynamical Systems \textbf{12} (1992), 283--295. MR 1176624
[Ku]
K. Kuratowski, Topology, vol.~I, Academic Press, New York, 1966. MR 217751
[L]
D. Lascar, Why some people are excited by Vaught{\rm '}s conjecture, J. Symbolic Logic \textbf{50} (1985), 973--982. MR 820126
[L-E]
E. G. K. Lopez-Escobar, An interpolation theorem for denumerably long formulas, Fund. Math. \textbf{57} (1965), 253--272. MR 188059
[Ma1]
G. W. Mackey, Borel structures in groups and their duals, Trans. Amer. Math. Soc. \textbf{85} (1957), 134--165. MR 89999
[Ma2]
G. W. Mackey, Point realizations of transformation groups, Illinois J. Math. \textbf{6} (1962), 327--335. MR 143874
[Ma3]
G. W. Mackey, Unitary group representations in physics, probability and number theory, Addison-Wesley, Reading, MA, 1989. MR 1043174
[Mi]
D. E. Miller, On the measurability of orbits in Borel actions, Proc. Amer. Math. Soc. \textbf{63} (1977), 165--170. MR 440519
[Mo]
C. C. Moore, \emph{Ergodic theory and von Neumann algebras} vol.~38, Amer. Math. Soc., Providence, RI, 1982 pp.~179--225. MR 679505
[N]
M. G. Nadkarni, On the existence of a finite invariant measure, Proc. Indian Acad. Sci. Math. Sci. \textbf{100} (1991), 203--220. MR 1081705
[O]
G. I. Olshanski, New {\rm ``}large groups{\rm ''} of type {\rm I}, J. Soviet Math. \textbf{18} (1982), 22--39. MR
[Ra1]
A. Ramsay, Topologies on measured groupoids, J. Funct. Anal. \textbf{47} (1982), 314--343. MR 665021
[Ra2]
A. Ramsay, Measurable group actions are essentially Borel actions, Israel J. Math. \textbf{51} (1985), 339--346. MR 804490
[Ro]
C. A. Rogers et al., Analytic sets, Academic Press, New York, 1980. MR 608794
[Sa]
R. Sami, Polish group actions and the Vaught Conjecture, Trans. Amer. Math. Soc. MR 1022169
[Sil]
J. H. Silver, Counting the number of equivalence classes of Borel and coanalytic equivalence relations, Ann. Math. Logic \textbf{18} (1980), 1--28. MR 568914
[Sin]
Ya. G. Sinai, Dynamical systems. {\rm II}, Springer-Verlag, New York, 1989. MR 1024068
[St]
J. R. Steel, \emph{On Vaught's Conjecture}, Cabal Seminar 76--77 vol.~689, Springer-Verlag, New York, 1978 pp.~193--208. MR 526920
[U]
V. V. Uspenskii, A universal topological group with a countable base, Funct. Anal. Appl. \textbf{20} (1986), 160--161. MR 847156
[Var]
V. S. Varadarajan, Groups of automorphisms of Borel spaces, Trans. Amer. Math. Soc. \textbf{109} (1963), 191--220. MR 159923
[Vau]
R. Vaught, Invariant sets in topology and logic, Fund. Math. \textbf{82} (1974), 269--294. MR 363912
[Ve]
A. M. Vershik, Description of invariant measures for the actions of some infinite-dimensional groups, Soviet Math. Dokl. \textbf{15} (1974), 1396--1400. MR
[VF]
A. M. Vershik and A. L. Fedorov, Trajectory theory, J. Soviet Math. \textbf{38} (1987), 1799--1822. MR
[Wh]
V. M. Wagh, A descriptive version of Ambrose{\rm '}s representation theorem for flows, Proc. Indian Acad. Sci. Math. Sci. \textbf{98} (1988), 101--108. MR 994127
[Wn]
S. Wagon, The Banach-Tarski paradox, Cambridge Univ. Press, Cambridge and New York, 1987. MR 803509
[Za]
P. Zakrzewski, The existence of invariant probability measures for a group of transformations, preprint, July 1991. MR 1239067
[Zi]
R. Zimmer, Ergodic theory and semisimple groups, Birkh\"auser, Basel, 1984. MR 776417

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Additional Information:

DOI: 10.1090/S0273-0979-1993-00383-5
PII: S 0273-0979(1993)00383-5