A note on the NFI-topology

Abstract

The NFI-topology, introduced in [S0], is a topology on the Stone space of a theory T that depends on a reduct T- of T. This topology has been used in [S0] to describe the set of universal transducers for (T,T-) (invariants sets that translates forking-open sets in T- to forking-open sets in T). In this paper we show that in contrast to the stable case, the NFI-topology need not be invariant over parameters in T- but a weak version of this holds for any simple T. We also note that for the lovely pair expansions, of theories with the wnfcp , the topology is invariant over in T-.