+This is very sketchy at this point, but it should give a sense of our intended scope.
+
+
+## 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
+2. Subtitution; using alpha-conversion and other strategies
+3. Conversion versus Reduction
+4. Eta reduction and "extensionality"
+5. Different evaluation strategies
+6. Strongly normalizing vs weakly normalizing vs non-normalizing; Church-Rosser Theorem(s)
+
+7. Encoding pairs (and triples and ...)
+8. Encoding booleans
+9. Church-like encodings of numbers, defining addition and multiplication
+10. Defining the predecessor function; alternate encodings for the numbers
+11. Homogeneous sequences or "lists"; how they differ from pairs, triples, etc.
+12. Representing lists as pairs
+13. Representing lists as folds
+14. Typical higher-order functions: map, filter, fold
+
+15. Recursion exploiting the fold-like representation of numbers and lists
+16. General recursion using omega
+17. The Y combinator(s); more on evaluation strategies
+
+18. Introducing the notion of a "continuation", which technique we'll now already have used a few times
+
+## Types ##
+
+1. Product or record types, e.g. pairs and triples
+2. Sum or variant types; tagged or "disjoint" unions
+3. Maybe/option types; representing "out-of-band" values
+4. Zero/bottom types
+5. Unit type
+6. Inductive types (numbers, lists)
+7. "Pattern-matching" or type unpacking
+
+8. The simply-typed lambda calculus
+
+9. Parametric polymorphism, System F, "type inference"
+
+10. [Phil/ling application] inner/outer domain semantics for positive free logic
+ <!-- <http://philosophy.ucdavis.edu/antonelli/papers/pegasus-JPL.pdf> -->
+
+11. [Phil/ling application] King vs Schiffer in King 2007, pp 103ff.
+12. [Phil/ling application] King and Pryor on that clauses, predicates vs singular property-designators
+13. Possible excursion: Frege's "On Concept and Object"
+
+14. Curry-Howard isomorphism between simply-typed lambda and intuitionistic propositional logic
+
+15. The types of continuations; continuations as first-class values
+16. [Phil/ling application] Partee on whether NPs should be uniformly interpreted as generalized quantifiers, or instead "lifted" when necessary. Lifting = a CPS transform.
+17. [Phil/ling application] Expletives
+
+18. Misc references: Chris?
+ * de Groeten on lambda-mu and linguistics?
+ * on donkey anaphora and continuations
+ * Wadler on symmetric sequent calculi
+
+19. Dependent types
+
+## Side-effects and mutation ##
+
+1. What difference imperativity makes
+2. Monads we've seen, and the "monadic laws" (computer science version)
+3. Side-effects in a purely functional setting, via monads
+4. The basis of monads in category theory
+5. Other interesting monads: reader monad, continuation monad
+
+6. [Phil/ling application] Monsters and context-shifting, e.g. Gillies/von Fintel on "ifs"
+7. Montague / Yoad Winter? (just have this written down in my notes, I assume Chris will remember the reference)
+
+8. Passing by reference
+9. [Phil/ling application] Fine and Pryor or "coordinated contents"
+
+
+## Continuations (continued) ##
+
+1. Using CPS to handle abortive computations
+2. Using CPS to do other handy things, e.g., coroutines
+3. Making evaluation order explicit with continuations (could also be done earlier, but I think will be helpful to do after we've encountered mutation)
+4. Delimited continuations
+5. [Phil/ling application] Barker/Shan on donkey anaphora
+
+
+## Preemptively parallel computing and linear logic ##
+
+1. Basics of parallel programming: semaphores/mutexes
+2. Contrasting "preemptive" parallelism to "cooperative" parallelism (coroutines, above)
+3. Linear logic
+4. [Phil/ling application] Barker on free choice
+
+