+
+## Programming in the pure untyped lambda calculus ##
+
+There are several ways to do this.
+
+1. The easiest is to use a JavaScript interpreter that Chris wrote. Go [here](/lambda-let.html) and follow the template:
+
+ let true = (\x (\y x)) in
+ let false = (\x (\y y)) in
+ let and = (\l (\r ((l r) false))) in
+
+ (
+
+ ((((and false) false) yes) no)
+
+ ((((and false) true) yes) no)
+
+ ((((and true) false) yes) no)
+
+ ((((and true) true) yes) no)
+
+ )
+
+ will evaluate to:
+
+ (no no no yes)
+
+ If you try to evaluate a non-terminating form, like `((\x (x x)) (\x (x x)))`, you'll probably have to force-quit your browser and start over. Anything you had earlier typed in the upper box will probably be lost.
+
+ Syntax: you have to fully specify parentheses and separate your lambdas. So for example, you can't write `(\x y. y)`; you have to write `(\x (\y y))`. The parser treats symbols that haven't yet been bound (as `yes` and `no` above) as free variables.
+
+
+2. A bit more flexibility and robustness can be had by using an OCaml package. This is based on a library on [a Haskell library by Oleg Kiselyov](http://okmij.org/ftp/Computation/lambda-calc.html#lambda-calculator-haskell).
+
+ Jim converted this to OCaml and bundled it with a syntax extension that makes
+it easier to write pure untyped lambda expressions in OCaml. You don't have to
+know much OCaml yet to use it. Using it looks like this:
+
+ let zero = << fun s z -> z >>;;
+ let succ = << fun n s z -> s (n s z) >>;;
+ let one = << $succ$ $zero$ >>;;
+ let two = << $succ$ $one$ >>;;
+ let add = << fun m n -> n $succ$ m >>;;
+ (* or *)
+ let add = << fun m n -> fun s z -> m s (n s z) >>;;
+ .
+ (* now use:
+ pp FORMULA to print a formula, unreduced
+ pn FORMULA to print the normal form of a formula (when possible)
+ pi FORMULA to print the integer which FORMULA is a Church numeral for (when possible)
+ .
+ alpha_eq FORM1 FORM2 are FORM1 and FORM2 syntactically equivalent (up to alpha-conversion)?
+ this does not do reductions on the formulae
+ *)
+ .
+ pi << $add$ $one$ $two$ >>;;
+ - : int = 3
+
+ To install this package, here's what you need to do. I've tried to explain it in basic terms, but you do need some familiarity with your operating system: for instance, how to open a Terminal window, how to figure out what directory the Terminal is open to (use `pwd`); how to change directories (use `cd`); and so on.
+
+ INCLUDE INSTRUCTIONS
+
+ We assume here that you've already [gotten OCaml installed on your computer](/how_to_get_the_programming_languages_running_on_your_computer/).
+
+ Some notes:
+
+ * When you're talking to the interactive OCaml program, you have to finish complete statements with a ";;". Sometimes these aren't necessary, but rather than learn the rules yet about when you can get away without them, it's easiest to just use them consistently, like a period at the end of a sentence.
+
+ * What's written betwen the `<<` and `>>` is parsed as an expression in the pure untyped lambda calculus. The stuff outside the angle brackets is regular OCaml syntax. Here you only need to use a very small part of that syntax: `let var = some_value;;` assigns a value to a variable, and `function_foo arg1 arg2` applies the specified function to the specified arguments. `church_to_int` is a function that takes a single argument --- the lambda expression that follows it, `<< $add$ $one$ $two$ >>` -- and, if that expression when fully reduced or "normalized" has the form of a "Church numeral", it converts it into an "int", which is OCaml's (and most language's) primitive way to represent small numbers. The line `- : int = 3` is OCaml telling you that the expression you just had it evaluate simplifies to a value whose type is "int" and which in particular is the int 3.
+
+ * If you call `church_to_int` with a lambda expression that doesn't have the form of a Church numeral, it will complain. If you call it with something that's not even a lambda expression, it will complain in a different way.
+
+ * The `$`s inside the `<<` and `>>` are essentially corner quotes. If we do this: `let a = << x >>;; let b = << a >>;; let c = << $a$ >>;;` then the OCaml variable `b` will have as its value an (atomic) lambda expression, consisting just of the variable `a` in the untyped lambda calculus. On the other hand, the OCaml variable `c` will have as its value a lambda expression consisting just of the variable `x`. That is, here the value of the OCaml variable `a` is spliced into the lambda expression `<< $a$ >>`.
+
+ * The expression that's spliced in is done so as a single syntactic unit. In other words, the lambda expression `<< w x y z >>` is parsed via usual conventions as `<< (((w x) y) z) >>`. Here `<< x y >>` is not any single syntactic constituent. But if you do instead `let a = << x y >>;; let b = << w $a$ z >>`, then what you get *will* have `<< x y >>` as a constituent, and will be parsed as `<< ((w (x y)) z) >>`.
+
+ * `<< fun x y -> something >>` is equivalent to `<< fun x -> fun y -> something >>`, which is parsed as `<< fun x -> (fun y -> (something)) >>` (everything to the right of the arrow as far as possible is considered together). At the moment, this only works for up to five variables, as in `<< fun x1 x2 x3 x4 x5 -> something >>`.
+
+ * The `<< >>` and `$`-quotes aren't part of standard OCaml syntax, they're provided by this add-on bundle. For the most part it doesn't matter if other expressions are placed flush beside the `<<` and `>>`: you can do either `<< fun x -> x >>` or `<<fun x->x>>`. But the `$`s *must* be separated from the `<<` and `>>` brackets with spaces or `(` `)`s. It's probably easiest to just always surround the `<<` and `>>` with spaces.
+
+
+<!--
+
+There are several ways to do this, and we're still thinking out loud in this space about which method we should recommend you use.
+
+1. To get started, Chris has a nice [Lambda Tutorial](http://homepages.nyu.edu/~cb125/Lambda)
+webpage introducing the untyped lambda calculus. This page has embedded Javascript
+code that enables you to type lambda expressions into your web browser page
+and click a button to "execute" (that is, reduce or normalize) it.
+
+ To do more than a few simple exercises, though, you'll need something more complex.
+
+2. One option is to use a short Scheme macro, like the one [linked at the bottom of Chris' webpage](http://homepages.nyu.edu/~cb125/Lambda/lambda.scm).
+You can use this by loading into a Scheme interpreter (EXPLAIN HOW...) and then (STEP BY STEP...).
+
+ Here's Chris' explanation of the macro:
+
+ (define (reduce f) ; 1
+ ((lambda (value) (if (equal? value f) f (reduce value))) ; 2
+ (let r ((f f) (g ())) ; 3
+ (cond ((not (pair? f)) ; 4
+ (if (null? g) f (if (eq? f (car g)) (cadr g) (r f (caddr g))))) ; 5
+ ((and (pair? (car f)) (= 2 (length f)) (eq? 'lambda (caar f))) ; 6
+ (r (caddar f) (list (cadar f) (r (cadr f) g) g))) ; 7
+ ((and (not (null? g)) (= 3 (length f)) (eq? 'lambda (car f))) ; 8
+ (cons 'lambda (r (cdr f) (list (cadr f) (delay (cadr f)) g)))) ; 9
+ (else (map (lambda (x) (r x g)) f)))))) ;10
+
+ If you have a Scheme interpreter, you can call the function like this:
+
+ (reduce '(((lambda x (lambda y (x y))) 2) 3))
+ ;Value: (2 3)
+
+ (reduce '((lambda x (lambda y (x y))) 2))
+ ;Value: (lambda #[promise 2] (2 #[promise 2]))
+
+ Comments: f is the form to be evaluated, and g is the local assignment
+ function; g has the structure (variable value g2), where g2 contains the rest
+ of the assignments. The named let function r executes one pass through a form.
+ The arguments to r are a form f, and an assignment function g. Line 2: continue
+ to process the form until there are no more conversions left. Line 4
+ (substitution): If f is atomic [or if it is a promise], check to see if matches
+ any variable in g and if so replace it with the new value. Line 6 (beta
+ reduction): if f has the form ((lambda variable body) argument), it is a lambda
+ form being applied to an argument, so perform lambda conversion. Remember to
+ evaluate the argument too! Line 8 (alpha reduction): if f has the form (lambda
+ variable body), replace the variable and its free occurences in the body with a
+ unique object to prevent accidental variable collision. [In this implementation
+ a unique object is constructed by building a promise. Note that the identity of
+ the original variable can be recovered if you ever care by forcing the
+ promise.] Line 10: recurse down the subparts of f.
+
+
+3. Oleg Kiselyov has a [richer lambda interpreter](http://okmij.org/ftp/Scheme/#lambda-calc) in Scheme. Here's how he describes it
+(I've made some trivial changes to the text):
+
+ A practical Lambda-calculator in Scheme
+
+ The code below implements a normal-order interpreter for the untyped
+ lambda-calculus. The interpret permits "shortcuts" of terms. The shortcuts are
+ not first class and do not alter the semantics of the lambda-calculus. Yet they
+ make complex terms easier to define and apply.
+
+ The code also includes a few convenience tools: tracing of all reduction,
+ comparing two terms modulo alpha-renaming, etc.
+
+ This calculator implements a normal-order evaluator for the untyped
+ lambda-calculus with shortcuts. Shortcuts are distinguished constants that
+ represent terms. An association between a shortcut symbol and a term must be
+ declared before any term that contains the shortcut could be evaluated. The
+ declaration of a shortcut does not cause the corresponding term to be
+ evaluated. Therefore shortcut's term may contain other shortcuts -- or even yet
+ to be defined ones. Shortcuts make programming in lambda-calculus remarkably
+ more convenient.
+
+ Besides terms to reduce, this lambda-calculator accepts a set of commands,
+ which add even more convenience. Commands define new shortcuts, activate
+ tracing of all reductions, compare terms modulo alpha-conversion, print all
+ defined shortcuts and evaluation flags, etc. Terms to evaluate and commands are
+ entered at a read-eval-print-loop (REPL) "prompt" -- or "included" from a file
+ by a special command.
+
+ Examples
+
+ First we define a few shortcuts:
+
+ (X Define %c0 (L s (L z z))) ; Church numeral 0
+ (X Define %succ (L n (L s (L z (s (n z z)))))) ; Successor
+ (X Define* %c1 (%succ %c0))
+ (X Define* %c2 (%succ %c1))
+ (X Define %add (L m (L n (L s (L z (m s (n s z))))))) ; Add two numerals
+
+ (%add %c1 %c2)
+ REPL reduces the term and prints the answer: (L f (L x (f (f (f x))))).
+
+ (X equal? (%succ %c0) %c1)
+ (X equal?* (%succ %c0) %c1)
+
+ The REPL executes the above commands and prints the answer: #f and #t,
+ correspondingly. The second command reduces the terms before comparing them.
+
+ See also <http://okmij.org/ftp/Computation/lambda-calc.html>.
+
+
+5. To play around with a **typed lambda calculus**, which we'll look at later
+in the course, have a look at the [Penn Lambda Calculator](http://www.ling.upenn.edu/lambda/).
+This requires installing Java, but provides a number of tools for evaluating
+lambda expressions and other linguistic forms. (Mac users will most likely
+already have Java installed.)
+
+## Reading about Scheme ##
+
+[R5RS Scheme](http://people.csail.mit.edu/jaffer/r5rs_toc.html)
+
+## Reading about OCaml ##
+
+-->
+
+