In [3], Martin computed the degrees of certain classes of RE sets. To state the results succinctly, some notation is useful.

If A is a set (of natural numbers), dg(A) is the (Turing) degree of A. If A is a class of sets, dg ( A ) = {dg(A): A ∈ A ). Let M be the class of maximal sets, HHS the class of hyperhypersimple sets, and DS the class of dense simple sets. Martin showed that dg ( M ), dg ( HHS ), and dg ( DS ) are all equal to the set H of RE degrees a such that a ′ = 0″.

Let M * be the class of coinfinite RE sets having no superset in M ; and define HHS * and DS * similarly. Martin showed that dg ( DS *) = H. In [2], Lachlan showed (among other things) that dg ( M *)⊆K, where K is the set of RE degrees a such that a ″ > 0″. We will show that K ⊆ dg ( HHS *). Since maximal sets are hyperhypersimple, this gives dg ( M *) = dg ( HHS *) = K.

These results suggest a problem. In each case in which dg(A) has been calculated, the set of nonzero degrees in dg(A) is either H or K or the empty set or the set of all nonzero RE degrees. Is this always the case for natural classes A? Natural here might mean that A is invariant under all automorphisms of the lattice of RE sets; or that A is definable in the first-order theory of that lattice; or anything else which seems reasonable.