|Abstract||The Borel reducibility theory of Polish equivalence relations, at least in its present form, was initiated independently in [FS89] and [HKL90]. There is now an extensive literature on this topic, including fundamental work on the Glimm-Effros dichotomy in [HKL90], on countable Borel equivalence relations in [DJK94], and on Polish group actions in [BK96].|
|Keywords||No keywords specified (fix it)|
|Categories||No categories specified (fix it)|
|Through your library||Only published papers are available at libraries|
Similar books and articles
Ramez L. Sami (1984). On ∑11 Equivalence Relations with Borel Classes of Bounded Rank. Journal of Symbolic Logic 49 (4):1273 - 1283.
Román Sasyk & Asger Törnquist (2009). Borel Reducibility and Classification of von Neumann Algebras. Bulletin of Symbolic Logic 15 (2):169-183.
Joël Combase (2011). A Silver-Like Perfect Set Theorem with an Application to Borel Model Theory. Notre Dame Journal of Formal Logic 52 (4):415-429.
Longyun Ding & Su Gao (2006). Diagonal Actions and Borel Equivalence Relations. Journal of Symbolic Logic 71 (4):1081 - 1096.
Slawomir Solecki (2000). Actions of Non-Compact and Non-Locally Compact Polish Groups. Journal of Symbolic Logic 65 (4):1881-1894.
Harvey Friedman & Lee Stanley (1989). A Borel Reducibility Theory for Classes of Countable Structures. Journal of Symbolic Logic 54 (3):894-914.
Samuel Coskey & Joel David Hamkins (2010). Infinite Time Decidable Equivalence Relation Theory. Notre Dame Journal of Formal Logic 52 (2):203-228.
Greg Hjorth (2005). Bi-Borel Reducibility of Essentially Countable Borel Equivalence Relations. Journal of Symbolic Logic 70 (3):979 - 992.
Christian Rosendal (2005). Cofinal Families of Borel Equivalence Relations and Quasiorders. Journal of Symbolic Logic 70 (4):1325 - 1340.
Added to index2009-01-28
Total downloads4 ( #178,876 of 551,105 )
Recent downloads (6 months)0
How can I increase my downloads?