Infinitary Logics and Abstract Elementary Classes

Abstract

We prove that every abstract elementary class (a.e.c.) with LST number and vocabulary τ of cardinality ≤ can be axiomatized in the logic L_2()+++,+(τ). In this logic an a.e.c. is therefore an EC class rather than merely a PC class. This constitutes a major improvement on the level of definability previously given by the Presentation Theorem. As part of our proof, we define the canonical tree S= S K of an a.e.c. K. This turns out to be an interesting combinatorial object of the class, beyond the aim of our theorem. Furthermore, we study a connection between the sentences defining an a.e.c. and the relatively new infinitary logic L1λ.