Expansions of models of ω-stable theories
Journal of Symbolic Logic 49 (2):470-477 (1984)
| Abstract | We prove that every relation-universal model of an ω-stable theory is saturated. We also show there is a large class of ω-stable theories for which every resplendent model is homogeneous | |||||||||
| Keywords | No keywords specified (fix it) | |||||||||
| Categories | ||||||||||
| Options |
|
|||||||||
Download options| PhilPapers Archive |
Upload a copy of this paper Check publisher's policy on self-archival Papers currently archived: 5,672 |
| External links |
 |
| Through your library | Configure |
Similar books and articlesAlf Onshuus (2006). Properties and Consequences of Thorn-Independence. Journal of Symbolic Logic 71 (1):1 - 21.
John T. Baldwin & Kitty Holland (2000). Constructing Ω-Stable Structures: Rank 2 Fields. Journal of Symbolic Logic 65 (1):371-391.
Ehud Hrushovski (1989). Kueker's Conjecture for Stable Theories. Journal of Symbolic Logic 54 (1):207-220.
Benoît Mariou (2001). Modèles Saturés Et Modèles Engendrés Par Des Indiscernables. Journal of Symbolic Logic 66 (1):325-348.
B. Hart, A. Pillay & S. Starchenko (1995). 1-Based Theories — the Main Gap for a -Models. Archive for Mathematical Logic 34 (5).
Alexander Berenstein (2003). Simple Stable Homogeneous Groups. Journal of Symbolic Logic 68 (4):1145-1162.
Saharon Shelah (1979). On Uniqueness of Prime Models. Journal of Symbolic Logic 44 (2):215-220.
Anand Pillay (1984). Regular Types in Nonmultidimensional Ω-Stable Theories. Journal of Symbolic Logic 49 (3):880-891.
Ludomir Newelski (1996). On Atomic or Saturated Sets. Journal of Symbolic Logic 61 (1):318-333.
Analytics
Monthly downloads
Sorry, there are not enough data points to plot this chart.
|
Added to index2009-01-28Total downloads1 ( #274,652 of 549,049 )Recent downloads (6 months)0How can I increase my downloads? |
My notes
Discussion
