Bounded ultraimaginary independence and its total Morley sequences

Abstract

We investigate the following model-theoretic independence relation: ∈dbu11.9mu7.5mu\!bu b ∈dbuA3mu c if and only if bddu(Ab) bddu(Ac) = bddu(A), where bddu(X) is the class of all ultraimaginaries bounded over X. In particular, we sharpen a result of Wagner to show that b ∈dbuA3mu c if and only if Autf(M/Ab)(M/Ac) = Autf(M/A), and we establish full existence over hyperimaginary parameters (i.e., for any set of hyperimaginaries A and ultraimaginaries b and c, there is a b' A b such that b' ∈dbuA3mu c). Extension then follows as an immediate corollary. We also study total -5mu∈dbu-Morley sequences (i.e., A-indiscernible sequences I satisfying J ∈dbuA3mu K for any J and K with J + K EMA I), and we prove that an A-indiscernible sequence I is a total -5mu∈dbu-Morley sequence over A if and only if whenever I and I' have the same Lascar strong type over A, I and I' are related by the transitive, symmetric closure of the relation 'J+K is A-indiscernible.' This is also equivalent to I being 'based on' A in a sense defined by Shelah in his early study of simple unstable theories. Finally, we show that for any A and b in any theory T, if there is an Erd\"os cardinal (α) with |Ab|+|T| < (α), then there is a total -5mu∈dbu-Morley sequence (bi)i<ω over A with b0 = b.