On the Dimension Theory of N1-Categorical Theories with the Nontrivial Strong Elementary Intersection Property. John W. Rosenthal,. John W. Rosenthal.

On the Dimension Theory of N1‐Categorical Theories with the Nontrivial Strong Elementary Intersection Property.John W. Rosenthal - 1979 - Mathematical Logic ...

On the Dimension Theory of N1‐Categorical Theories with the Nontrivial Strong Elementary Intersection Property. Authors. John W. Rosenthal. Source Information.

Introduction. The structure of models of a countable theory that is categorical in an uncountable power has been studied extensively by Morley [Mor], Marsh.

On the Dimension Theory of N1‐Categorical Theories with the Nontrivial Strong Elementary Intersection Property. [...] John W. Rosenthal 1• Institutions (1).

Nov 28, 2017 · It turns out that categorical theories are rare. However, having a ... which is an increasing union of strong substructures of N1. For ...

It tries to find dividing lines, prove their conse- quences, prove “structure theorems, positive theorems” on those in the “low side” (in particular stable and ...

Nevertheless, there is a meaningful notion of strongly minimal sets in con- tinuous logic which is a non-trivial generalization of the notion in discrete logic.

Jun 7, 2020 · This shows that, up to isomorphism, there is only one algebraically closed field with cardinality κ and characteristic p, where we allow p = 0.

This volume comprises a mix of new research, retrospective reviews, and informal histories, all concerning or inspired by the contributions to model theory ...