Contrasting the Halves of an Ahmad Pair

Abstract

We study Ahmad pairs in the 02 enumeration degrees. (A,B) is an Ahmad pair if A ≤e B and every Z <e A satisfies Z ≤e B. We characterize the degrees that are the left halves of an Ahmad pair as those that are and join irreducible. We then show that the right half has to be giving a natural separation between the two halves which is a significant strengthening of previous work. We define a hierarchy of join irreducibility notions using which we characterize the left halves of Ahmad n-pairs as those that are and n-join irreducible, while the right halves are . This allows us to extend and clarify previous work to show that for any n, there is a set A which is the left half of an Ahmad n-pair but not of an Ahmad (n+1)-pair. These results have new implications about the ∀ ∃-theory of the 02 e-degrees as a partial order and also provide a new 3 definition of as well as .

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