^{page 325 note 1} Davis, Stephen T., ‘A Defence of the Free Will Defence’, Religious Studies, Vol. 8, No. 4, December 1972, 335–44.CrossRefGoogle Scholar

^{page 325 note 2} Mackie, J. L., ‘Evil and Omnipotence’, Pike, Nelson (ed.), God and Evil (Englewood Cliffs, N.J.: Prentice-Hall, 1964), p. 56.Google Scholar

^{page 327 note 1} For an account of the ‘standard Lewis systems’, T, S4 and S5, see Hughes, G. E. and Cresswell, M. J., An Introduction to Modal Logic (London, Methuen, 1968), chapters 2 and 3.Google Scholar System T (due to Robert Feys) is the basic system of which S4 and S5 are extensions. T was proved equivalent to the System M of von Wright by Sobocinski in 1953. The essentials of System T are quite simple (for our purposes).

System T

Ax. 1: L p ⊃ p [Axiom of Necessity]

Ax. 2: L(p ⊃ q) ⊃ (L p ⊃ L q)

Rule I: If α is a theorem, L α is a theorem [Gödel Rule of Necessitation]

Definition: M p = df ∼ L ∼ p

Also note that System T is an extension of PC: all truth-functional rules and theorems are assumed to hold.

^{page 329 note 1} ‘∼ (p ⊰ ∼ (Mp & M ∼ p))’ is not a theorem in the standard Lewis systems.

^{page 329 note 2} Vide Hughes, and Creswell, (op. cit.), p. 28.Google Scholar

^{page 329 note 3} For some systems of this type see Feys, Robert, Modal Logics (edited with some complements by Dopp, Joseph, Nauwelaerts, E., Louvain, Belgium, 1965), p. 133 f.Google Scholar