Name
Abstract | ||
|---|---|---|
Assume that the class of partial automorphisms of the monster model of a complete theory has the amalgamation property. The beautiful automorphisms are the automorphisms of models ofT which: 1. are strong, i.e. leave the algebraic closure (inTeq) of the empty set pointwise fixed, 2. are obtained by the Fraïsse construction using the amalgamation property that we have just mentioned. We show that all the beautiful automorphisms have the same theory (in the language ofT plus one unary function symbol for the automorphism), and we study this theory. In particular, we examine the question of the saturation of the beautiful automorphisms. We also prove that in some cases (in particular if the theory is ?-stable andG-trivial), almost all (in the sense of Baire categoricity) automorphisms of the saturated countable model are beautiful and conjugate. |
Year | DOI | Venue |
|---|---|---|
1991 | 10.1007/BF01370694 | Arch. Math. Log. |
Field | DocType | Volume |
Discrete mathematics,Empty set,Combinatorics,Countable set,Automorphisms of the symmetric and alternating groups,Algebraic closure,Automorphism,Unary function,Baire space,Amalgamation property,Mathematics | Journal | 31 |
Issue | Citations | PageRank |
1 | 4 | 3.90 |
References | Authors | |
0 | 1 | |
Name | Order | Citations | PageRank |
|---|---|---|---|
| Daniel Lascar | 1 | 59 | 32.71 |