An analogue of U-rank for atomic classes

Abstract

For a countable, complete, first-order theory T, we study At, the class of atomic models of T. We develop an analogue of U-rank and prove two results. On one hand, if some tp(d/a) is not ranked, then there are 21 non-isomorphic models in At of size 1. On the other hand, if all types have finite rank, then the rank is fully additive and every finite tuple is dominated by an independent set of realizations of pseudo-minimal types.

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