## Topics by content ##
-* [[Basics of functional programming|topics/week1]]
+* [[Introduction to functional programming|topics/week1 kapulet intro]]
* [[Order: static versus dynamic|topics/week1 order]]
## Topics by week ##
-Week 1:
+Week 1:
-* [[Order in programming languages and natural language|topics/order]]
+* [[Order in programming languages and natural language|topics/week1 order]]
This discussion considers conjunction in a language that recognized presupposition failure.
-* [[Introduction to functional programming|topics/week1]]
+* [[Introduction to functional programming|topics/week1 kapulet intro]]
Basics of functional programming: `let`, `case`, pattern matching, and
recursion. Definitions of factorial.
+* [[Advanced notes on functional programming|topics/week1 kapulet advanced]]
* [[Homework for week 1|exercises/assignment1]]
-* [[Advanced notes|week1 advanced notes]]
+
+Week 2:
+
+* [[Introduction to the Lambda Calculus|topics/week2 lambda intro]]
+* [[Advanced notes on the Lambda Calculus|topics/week2 lambda advanced]]
+* Encoding Booleans, Tuples, Lists, and Numbers (in progress)
+* Homework for week 2 (in progress)
+
+
+
*More coming, please wait...*
-<!--
-Once we get up and running, the central focii of the course will be
-**continuations**, **types**, and **monads**. One of the on-going themes will
-concern evaluation order and issues about how computations (inferences,
-derivations) unfold in (for instance) time. The key analytic technique is to
-form a static, order-independent model of a dynamic process. We'll be
-discussing this in much more detail as the course proceeds.
-
-The logical systems we'll be looking at include:
-
-* the "pure"/untyped lambda calculus
-* combinatorial logic
-* the simply-typed lambda calculus
-* polymorphic types with System F
-* some discussion of dependent types
-* if time permits, "indeterministic" or "preemptively parallel" computation and linear logic
-
-
-Other keywords:
- recursion using the Y-combinator
- evaluation-order stratgies
- normalizing properties
- the Curry-Howard isomorphism(s)
- monads in category theory and computation
--->