Copies of Monomorphic Structures
Abstract
The poset of copies of a relational structure X is the partial order P ( X) ,⊂ , where P ( X)=\ Y⊂ X: Y X\. Investigating the classification of structures related to isomorphism of the Boolean completions B X = ro( sq ( P ( X) )) we extend the results concerning linear orders to the class of structures definable in linear orders by first-order 0-formulas (monomorphic structures). So, B X B L holds for some linear order L, if X is definable in a σ-scattered (in particular, countable) or additively indecomposable linear order. For example, B X ro( S ), where S is the Sacks forcing, whenever X is a non-constant structure chainable by a real order type containing a perfect set.
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