Monadic second order limit laws for natural well orderings

Abstract: By combining classical results of Büchi, some elementary Tauberian theorems and some basic tools from logic and combinatorics we show that every ordinal α with ε 0 ≥ α ≥ ω ω satisfies a natural monadic second order limit law and that every ordinal α with ω ω > α ≥ ω satisfies a natural monadic second order Cesaro limit law. In both cases we identify as usual α with the class of substructures {β : β < α}.We work in an additive setting where the norm function N assigns to every ordinal α the number of occurrrenc… Show more