Axiomatizing AECs and applications

Abstract

For any abstract elementary class (AEC) K with λ=LS( K), the following holds: 1. K has an axiomatization in L(2λ)+,λ+, allowing game quantification. If K has arbitrarily large models, the λ-amalgamation property and is categorical both in λ and λ+, then it has an axiomatization in Lλ+,λ+ with game quantification. These extend Kueker's result which assumes finite character and λ=0. 2. If K is universal and categorical in λ, then it is axiomatizable in Lλ+,λ+. 3. Shelah's celebrated presentation theorem asserts that for any AEC K there is a first-order theory in an expansion of L( K), and a set of 2λ many T-types such that K=PC(T,,L( K)). We provide a better bound on || in terms of I2(λ, K). 4. We present additional applications which extend, simplify and generalize results of Shelah and Shelah-Vasey. Some of our main results generalize to μ-AECs.