Semigroups in Stable Structures
Abstract
Assume G is a definable group in a stable structure M. Newelski showed that the semigroup SG(M) of complete types concentrated on G is an inverse limit of the ∞-definable (in Meq) semigroups SG,(M). He also shows that it is strongly π-regular: for every p∈ SG,(M) there exists n∈N such that pn is in a subgroup of SG,(M). We show that SG,(M) is in fact an intersection of definable semigroups, so SG(M) is an inverse limit of definable semigroups and that the latter property is enjoyed by all ∞-definable semigroups in stable structures.
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