论文信息 - Proof-theoretic Semantics for Classical Mathematics

Proof-theoretic Semantics for Classical Mathematics

We discuss the semantical categories of base and object implicit in the Curry-Howard theory of types and we derive derive logic and, in particular, the comprehension principle in the classical version of the theory. Two results that apply to both the classical and the constructive theory are discussed. First, compositional semantics for the theory does not demand ‘incomplete objects’ in the sense of Frege: bound variables are in principle eliminable. Secondly, the relation of extensional equality for each type is definable in the Curry-Howard theory.

William W. Tait

[1] Willard Van Orman Quine. Mathematical Logic: Revised Edition , 1982 .

[2] Douglas S. Bridges,et al. Constructivity in Mathematics , 2004 .

[3] M. Schönfinkel. Über die Bausteine der mathematischen Logik , 1924 .

[4] Giovanni Sambin,et al. Twenty-five years of constructive type theory. , 1998 .

[5] Willard Van Orman Quine,et al. Selected Logic Papers , 1966 .

[6] William A. Howard,et al. The formulae-as-types notion of construction , 1969 .

[7] Per Martin-Löf,et al. An intuitionistic theory of types , 1972 .