Decidability and essential undecidability
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There are a number of open problems involving the concepts of decidability and essential undecidability . This paper will present solutions to some of these problems. Specifically: (1) Can a decidable theory have an essentially undecidable, axiomatizable extension (with the same constants)? (2) Are all the complete extensions of an undecidable theory ever decidable? We shall show that the answer to both questions is in the affirmative. In answering question (1), the decidable theory for which an essentially undecidable axiomatizable extension will be constructed is the theory of the successor function and a single one-place predicate. It will also be shown that the decidability of this theory is a “best possible” result in the following direction: the theory of either of the common diadic arithmetic functions and a one-place predicate; i.e., of addition and a one-place predicate, or of multiplication and a one-place predicate, is undecidable. Before establishing the main result, it is convenient to give a simple proof that a decidable theory can have an axiomatizable (simply) undecidable extension. This is, of course, an immediate consequence of the main result; but the proof is simple and illustrates the methods that we are going to use in this paper.
[1] A. Harnack. Ueber die Verwerthung der elliptischen Functionen für die Geometrie der Curven dritten Grades , 1875 .
[2] H. Bedmann,et al. Beiträge zur Algebra der Logik, insbesondere zum Entscheidungsproblem , 1922 .
[3] Willard Van Orman Quine,et al. Methods of Logic , 1951 .
[4] John R. Myhill. Solution of a Problem of Tarski , 1956, J. Symb. Log..