Keisler's Order and Full Boolean-Valued Models

Abstract

We prove a compactness theorem for full Boolean-valued models. As an application, we show that if T is a complete countable theory and B is a complete Boolean algebra, then λ+-saturated B-valued models of T exist. Moreover, if U is an ultrafilter on T and M is a λ+-saturated B-valued model of T, then whether or not M/U is λ+-saturated just depends on U and T; we say that U λ+-saturates T in this case. We show that Keisler's order can be formulated as follows: T0 T1 if and only if for every cardinal λ, for every complete Boolean algebra B with the λ+-c.c., and for every ultrafilter U on B, if U λ+-saturates T1, then U λ+-saturates T0.