A machine assisted proof of the subject reduction property for small typed functional language. Master Thesis

Bove, Ana

Resumen:

We present an experiment in formally describing a programming language and its properties in constructive type theory. By constructive type theory we understand primarily the formulation of Martin Löf's set theory. Constructive type theory can also be seen as a programming language where we write types, and objects of these types can be view as funtional programming environments of proof assistants. The language we analyze is a small typed functional language. We present its syntax, its dynamic semanctics and its type system. Among other properties, we present a formalization pf the Subject Reduction property for the language. The proof assistant we use is ALF.


Detalles Bibliográficos
1995
PROGRAMACION FUNCIONAL
ALF
TEORIA DE TIPOS
TYPE THEORY
FUNCTIONAL PROGRAMMING
Inglés
Universidad de la República
COLIBRI
http://hdl.handle.net/20.500.12008/2912
Acceso abierto
Licencia Creative Commons Atribución – No Comercial – Sin Derivadas (CC BY-NC-ND 4.0)
Resumen:
Sumario:We present an experiment in formally describing a programming language and its properties in constructive type theory. By constructive type theory we understand primarily the formulation of Martin Löf's set theory. Constructive type theory can also be seen as a programming language where we write types, and objects of these types can be view as funtional programming environments of proof assistants. The language we analyze is a small typed functional language. We present its syntax, its dynamic semanctics and its type system. Among other properties, we present a formalization pf the Subject Reduction property for the language. The proof assistant we use is ALF.