Asymmetric regular types

Abstract

We study asymmetric regular types. If p is regular and A-asymmetric then there exists a strict order such that Morley sequences in p over A are strictly increasing (we allow Morley sequences to be indexed by elements of a linear order). We prove that for all M⊃eq A maximal Morley sequences in p over A consisting of elements of M have the same (linear) order type, denoted by p,A(M), which does not depend on the particular choice of the order witnessing the asymmetric regularity. In the countable case we determine all possibilities for p,A(M): either it can be any countable linear order, or in any M⊃eq A it is a dense linear order (provided that it has at least two elements). Then we study relationship between p,A(M) and q,A(M) when p and q are strongly regular, A-asymmetric, and such that p A and q A are not weakly orthogonal. We distinguish two kinds on non-orthogonality: bounded and unbounded. In the bounded case we prove that p,A(M) and q,A(M) are either isomorphic or anti-isomorphic. In the unbounded case, p,A(M) and q,A(M) may have distinct cardinalities but we prove that their Dedekind completions are either isomorphic or anti-isomorphic. We provide examples of all four situations.