R. L. Epstein3540097104, 9783540097105
is accessible to any student with a slight background in logic and recursive function
theory. Degrees are defined and their basic properties established, accompanied by
a number of exercises.
The structure of the degrees is studied and a new proof is given that every
countable distributive lattice is isomorphic to an initial segMent of degrees. The
relationship between these initial segments and the jump operator is studied. The
significance of this work for the first-order theory of degrees is analyzed: it is
shown that degree theory is equivalent to second-order arithmetic. Sufficient con-
ditions are established for the degrees above a given degree to be not isomorphic to
and have different first-order theory than the degrees, with or without jump.
The degrees below the halting problem are introduced and surveyed. Priority
arguments are presented. The theory of these degrees is shown to be undecidable.
The history of the subject is traced in the notes and annotated bibliography.
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