-This is very sketchy at this point, but it should give a sense of our intended scope.
+# Lecture Notes #
+
+[[Week1]] (13 Sept) Applications; Basics of Lambda Calculus; Comparing Different Languages
+
+Week2 (20 Sept) Reduction and Convertibility; Combinators; Evaluation Strategies and Normalization; Decidability; Lists and Numbers
+
+Week3 (27 Sept) Recursion with Fixed Point Combinators
+Introducing the notion of a "continuation", which technique we'll now already have used a few times
-## Introduction ##
-
-1. Declarative vs imperatival models of computation.
-2. Variety of ways in which "order can matter."
-3. Variety of meanings for "dynamic."
-4. Schoenfinkel, Curry, Church: a brief history
-5. Functions as "first-class values"
-6. "Curried" functions
-
-## The "pure" or untyped lambda calculus ##
-
-1. Beta reduction
-1. Substitution; using alpha-conversion and other strategies
-1. Conversion versus reduction
-1. Eta reduction and "extensionality"
-1. Different evaluation strategies (call by name, call by value, etc.)
-1. Strongly normalizing vs weakly normalizing vs non-normalizing; Church-Rosser Theorem(s)
-1. Lambda calculus compared to combinatorial logic<p>
-1. Encoding pairs (and triples and ...)
-1. Encoding booleans
-1. Church-like encodings of numbers, defining addition and multiplication
-1. Defining the predecessor function; alternate encodings for the numbers
-1. Homogeneous sequences or "lists"; how they differ from pairs, triples, etc.
-1. Representing lists as pairs
-1. Representing lists as folds
-1. Typical higher-order functions: map, filter, fold<p>
-1. Recursion exploiting the fold-like representation of numbers and lists ([[!wikipedia Deforestation (computer science)]], [[!wikipedia Zipper (data structure)]])
-1. General recursion using omega
-1. The Y combinator(s); more on evaluation strategies<p>
-1. Introducing the notion of a "continuation", which technique we'll now already have used a few times
+
+# Still To Come #
+
+This is very sketchy at this point, but it should give a sense of our intended scope.
## Types ##