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Math
788 — Fall 2001
Topics in Applied Logic: Typed and Untyped Lambda Calculus
| Instructor: |
Richard Platek |
| Time: |
M 4:00–6:30 |
| Room: |
Malott 205 |
We will examine the syntax, semantics and pragmatics of various lambda
calculi as well as applications to the foundations of programming languages.
Alonzo Church originally defined lambda calculus in the 1930s. The untyped
version was the salvageable part of an inconsistent, universal "System
of Logic," which he had proposed. Church then when on to define the typed
lambda calculus which was the backbone of his elegant version of the simple
theory of types. Both of these calculi and their extensions have been
amazingly influential in recursion theory and computer science. On the
theoretical side, Church's Thesis, which identifies intuitive computability
with a precise technical notion, was formulated for the lambda calculus.
More recently, the lambda calculus has been used to provide a natural
framework in which to discuss generalized recursion theory. On the practical
side, the Lisp programming language, one of the most long-lived of programming
languages, owes its power to its direct appropriation of features from
the untyped lambda calculus. The typed lambda calculus, on the other hand,
is the ancestor of all typed functional languages. It is the Mother of
Functional Programming.
The course will be based on chapters from a forthcoming book by Nerode,
Odifreddi, and Platek.
Last modified:
April 7, 2003
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