A Note on Always Decidable Propositional Forms

Abstract

We ask the following question: If all instantiations of a propositional formula A(x1,...,xn) in n propositional variables are decidable in some sufficiently strong recursive theory, does it follow that A is tautological or contradictory? and answer it in the affirmative. We also consider the following related question: Suppose that for some propositional formula A(x1,...,xn), there is a Turing program P such that P([φ1],...,[φn])=1 iff N A(φ1,...,φn) and otherwise P([φ1],...,[φn])=0 (where [φ] denotes the G\"odel number of φ), does it follow that the truth value of A(φ1,...,φn) is independent of φ1,...,φn and hence that A is tautological or contradictory?