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Chapter 22

Scheme: An Uncommon Lisp

The best laid schemes o' mice an' men

-Robert Burns (1759-1796)

This chapter presents the Scheme dialect of Lisp and an interpreter for it. While it is not likely that you would use this interpreter for any serious programming, understanding how the interpreter works can give you a better appreciation of how Lisp works, and thus make you a better programmer. A Scheme interpreter is used instead of a Common Lisp one because Scheme is simpler, and also because Scheme is an important language that is worth knowing about.

Scheme is the only dialect of Lisp besides Common Lisp that is currently flourishing. Where Common Lisp tries to standardize all the important features that are in current use by Lisp programmers, Scheme tries to give a minimal set of very powerful features that can be used to implement the others. It is interesting that among all the programming languages in the world, Scheme is one of the smallest, while Common Lisp is one of the largest. The Scheme manual is only 45 pages (only 38 if you omit the example, bibliography, and index), while Common Lisp the Language, 2d edition, is 1029 pages. Here is a partial list of the ways Scheme is simpler than Common Lisp:

  1. Scheme has fewer built-in functions and special forms. !!!(p) {:.numlist}

  2. Scheme has no special variables, only lexical variables. !!!(p) {:.numlist}

  3. Scheme uses the same name space for functions and variables (and everything else). !!!(p) {:.numlist}

  4. Scheme evaluates the function part of a function call in exactly the same way as the arguments. !!!(p) {:.numlist}

  5. Scheme functions can not have optional and keyword parameters. However, they can have the equivalent of a &rest parameter. !!!(p) {:.numlist}

  6. Scheme has no block, return, go, orthrow; a single function (call/cc) replaces all of these (and does much more). !!!(p) {:.numlist}

  7. Scheme has no packages. Lexical variables can be used to implement package-like structures. !!!(p) {:.numlist}

  8. Scheme, as a standard, has no macros, although most implementations provide macros as an extension. !!!(p) {:.numlist}

  9. Scheme has no special forms for looping; instead it asks the user to use recursion and promises to implement the recursion efficiently. !!!(p) {:.numlist}

The five main special forms in Scheme are quote and if, which are just as in Common Lisp; begin and set!, which are just different spellings for progn and setq; and lambda, which is as in Common Lisp, except that it doesn't require a # 'before it. In addition, Scheme allows variables, constants (numbers, strings, and characters), and function calls. The function call is different because the function itself is evaluated in the same way as the arguments. In Common Lisp, (f x) means to look up the function binding of f and apply that to the value of x. In Scheme, (f x) means to evaluate f (in this case by looking up the value of the variable f ), evaluate x (by looking up the value of the variable in exactly the same way) and then apply the function to the argument. Any expression can be in the function position, and it is evaluated just like the arguments. Another difference is that Scheme uses #t and #f for true and false, instead of t and nil. The empty list is denoted by (), and it is distinct from the false value, #f. There are also minor lexical differences in the conventions for complex numbers and numbers in different bases, but these can be ignored for all the programs in this book. Also, in Scheme a single macro, define, serves to define both variables and functions.

Scheme Common Lisp
var var
constant constant
(quotex) or 'x (quotex) or 'x
(beginx...) (prognx...)
(set!var x) (setqvar x)
(ifpab) (ifpab)
(lambdaparms x...) #' (lambdaparms x...)
(fn arg...) (fn arg...) or (funcallfn arg...)
#t t
#f nil
( ) nil
(definevarexp) (defparametervar exp)
(define (fnparm...) body) (defunfn (parm...) body)

Exercise 22.1 [s] What does the following expression evaluate to in Scheme? How many errors does it have as a Common Lisp expression?

((if (= (+  2 2) 4)
      (lambda (x y) (+ (* x y) 12))
      cons)
  5
  6)

A great many functions, such as car, cdr, cons, append, +, *, and list are the same (or nearly the same) in both dialects. However, Scheme has some spelling conventions that are different from Common Lisp. Most Scheme mutators, like set!, end in '!' Common Lisp has no consistent convention for this; some mutators start with n (nreverse, nsubst, nintersection) while others have idiosyncratic names (delete versus remove). Scheme would use consistent names-reverse! and remove! -if these functions were defined at all (they are not defined in the standard). Most Scheme predicates end in '?', not 'p'. This makes predicates more obvious and eliminates the complicated conventions for adding a hyphen before the p.1 The only problem with this convention is in spoken language: is equal? pronounced "equal-question-mark" or "equal-q" or perhaps equal, with rising intonation? This would make Scheme a tone language, like Chinese.

In Scheme, it is an error to apply car or cdr to the empty list. Despite the fact that Scheme has cons, it calls the result a pair rather than a cons cell, so the predicate is pair?, not consp.

Scheme recognizes not all lambda expressions will be "functions" according to the mathematical definition of function, and so it uses the term "procedure" instead. Here is a partial list of correspondences between the two dialects:

Scheme Procedure Common Lisp Function
char-ready? listen
char? characterp
eq? eq
equal? equal
eqv? eql
even? evenp
for-each mapc
integer? integerp
list->string coerce
list->vector coerce
list-ref nth
list-tail nthcdr
map mapcar
negative? minusp
pair? consp
procedure? functionp
set! setq
set-car! replaca
vector-set! setf
string-set! setf

22.1 A Scheme Interpreter

As we have seen, an interpreter takes a program (or expression) as input and returns the value computed by that program. The Lisp function eval is thus an interpreter, and that is essentially the function we are trying to write in this section. We have to be careful, however, in that it is possible to confuse the notions of interpreter and compiler. A compiler takes a program as input and produces as output a translation of that program into some other language-usually a language that can be directly (or more easily) executed on some machine. So it is also possible to write eval by compiling the argument and then interpreting the resulting machine-level program. Most modern Lisp systems support both possibilities, although some only interpret code directly, and others compile all code before executing it. To make the distinction clear, we will not write a function called eval. Instead, we will write versions of two functions: interp, a Scheme interpreter, and, in the next chapter, comp, a Scheme compiler.

An interpreter that handles the Scheme primitives is easy to write. In the interpreter interp, the main conditional has eight cases, corresponding to the five special forms, symbols, other atoms, and procedure applications (otherwise known as function calls). For the moment we will stick with t and nil instead of #t and #f. After developing a simple interpreter, we will add support for macros, then develop a tail-recursive interpreter, and finally a continuation-passing interpreter. (These terms will be defined when the time comes.). The glossary for interp is in figure 22.1.

Top-Level Functions
scheme A Scheme read-interp-print loop
interp Interpret (evaluate) an expression in an environment.
def-scheme-macro Define a Scheme macro.
Special Variables
*scheme-procs* Some procedures to store in the global environment.
Auxiliary Functions
set-var! Set a variable to a value
get-var Get the value of a variable in an environment.
set-global-var! Set a global variable to a value.
get-global-var Get the value of a variable from the global environment.
extend-env Add some variables and values to an environment.
init-scheme-iterp Initialize some global variables.
init-scheme-proc Define a primitive Scheme procedure.
scheme-macro Retrieve the Scheme macro for a symbol.
scheme-macro-expand Macro-expand a Scheme expression.
maybe-add Add an element to the front of a non-singleton list.
print-proc Print a procedure.
Data Type (tail-recursive version only)
proc A Scheme procedure.
Functions (continuation version only)
interp-begin Interpret a begin expression.
interp-call Interpret a function application.
map-interp Map interp over a list.
call/cc call with current continuation.
Previously Defined Functions
lastl Select the last element of a list.
length=1 Is this a list of length 1?
Table 22.1: Glossary for the Scheme Interpreter

The simple interpreter has eight cases to worry about: (1) If the expression is a symbol, look up its value in the environment. (2) If it is an atom that is not a symbol (such as a number), just return it. Otherwise, the expression must be a list. (3) If it starts with quote, return the quoted expression. (4) If it starts with begin, interpret each subexpression, and return the last one. (5) If it starts with set!, interpret the value and then set the variable to that value. (6) If it starts with if, then interpret the conditional, and depending on if it is true or not, interpret the then-part or the else-part. (7) If it starts with lambda, build a new procedure-a closure over the current environment. (8) Otherwise, it must be a procedure application. Interpret the procedure and all the arguments, and apply the procedure value to the argument values.

(defun interp (x &optional env)
  "Interpret (evaluate) the expression x in the environment env."
  (cond
    ((symbolp x) (get-var x env))
    ((atom x) x)
    ((case (first x)
       (QUOTE  (second x))
       (BEGIN  (last1 (mapcar #'(lambda (y) (interp y env))
                              (rest x))))
       (SET!   (set-var! (second x) (interp (third x) env) env))
       (IF     (if (interp (second x) env)
                   (interp (third x) env)
                   (interp (fourth x) env)))
       (LAMBDA (let ((parms (second x))
                     (code (maybe-add 'begin (rest2 x))))
                 #'(lambda (&rest args)
                     (interp code (extend-env parms args env)))))
       (t      ;; a procedure application
               (apply (interp (first x) env)
                      (mapcar #'(lambda (v) (interp v env))
                              (rest x))))))))

An environment is represented as an association list of variable/value pairs, except for the global environment, which is represented by values on the global-val property of symbols. It would be simpler to represent the global environment in the same way as local environments, but it is more efficient to use property lists than one big global a-list. Furthermore, the global environment is distinct in that every symbol is implicitly defined in the global environment, while local environments only contain variables that are explicitly mentioned (in a lambda expression).

As an example, suppose we interpret the function call (f 1 2 3), and that the functions f has been defined by the Scheme expression:

(set! f (lambda (a b c) (+ a (g b c))))

Then we will interpret ( f 1 2 3 ) by interpreting the body of f with the environment:

((a 1) (b 2) (c 3))

Scheme procedures are implemented as Common Lisp functions, and in fact all the Scheme data types are implemented by the corresponding Common Lisp types. Iinclude the function init-scheme- interp to initialize a few global values and repeat the definitions of last1 and length=1:

(defun set-var! (var val env)
  "Set a variable to a value, in the given or global environment."
  (if (assoc var env)
      (setf (second (assoc var env)) val)
      (set-global-var! var val))
  val)

(defun get-var (var env)
  "Get the value of a variable, from the given or global environment."
    (if (assoc var env)
        (second (assoc var env))
        (get-global-var var)))

(defun set-global-var! (var val)
  (setf (get var 'global-val) val))

(defun get-global-var (var)
  (let* ((default "unbound")
         (val (get var 'global-val default)))
    (if (eq val default)
        (error "Unbound scheme variable: ~a" var)
        val)))

(defun extend-env (vars vals env)
  "Add some variables and values to an environment."
  (nconc (mapcar #'list vars vals) env))

(defparameter *scheme-procs*
  '(+ - * / = < > <= >= cons car cdr not append list read member
    (null? null) (eq? eq) (equal? equal) (eqv? eql)
    (write prin1) (display princ) (newline terpri)))

(defun init-scheme-interp ()
  "Initialize the scheme interpreter with some global variables."
  ;; Define Scheme procedures as CL functions:
  (mapc #'init-scheme-proc *scheme-procs*)
  ;; Define the boolean `constants'. Unfortunately, this won't
  ;; stop someone from saying: (set! t nil)
  (set-global-var! t t)
  (set-global-var! nil nil))

(defun init-scheme-proc (f)
  "Define a Scheme procedure as a corresponding CL function."
  (if (listp f)
      (set-global-var! (first f) (symbol-function (second f)))
      (set-global-var! f (symbol-function f))))
(defun maybe-add (op exps &optional if-nil)
  "For example, (maybe-add 'and exps t) returns
  t if exps is nil, exps if there is only one,
  and (and exp1 exp2...) if there are several exps."
  (cond ((null exps) if-nil)
              ((length=1 exps) (first exps))
              (t (cons op exps))))
(defun length=1 (x)
  "Is x a list of length 1?"
  (and (consp x) (null (cdr x))))
(defun lastl (list)
  "Return the last element (not last cons cell) of list"
  (first (last list)))

To test the interpreter, we add a simple read-eval-print loop:

(defun scheme ()
  "A Scheme read-eval-print loop (using interp)"
  (init-scheme-interp)
  (loop (format t "~&==> ")
        (print (interp (read) nil))))

And now we're ready to try out the interpreter. Note the Common Lisp prompt is ">," while the Scheme prompt is "==>."

> (scheme)
==> (+  2 2)
4
==> ((if (=  1 2) * +) 3 4)
7
==> ((if (=  1 1) * +) 3 4)
12

==> (set! fact (lambda (n)

                (if (= n 0) 1
                    (* n (fact (- n 1))))))
#<DTP-LEXICAL-CLOSURE 36722615  >
==> (fact 5)
120

==> (set! table (lambda (f start end)

                    (if (<= start end)
                        (begin
                          (write (list start (f start)))
                          (newline)
                          (table f (+ start 1) end)))))
#<DTP-LEXICAL-CLOSURE 41072172  >
==> (table fact 1 10)
(1 1)
(2 2)
(3 6)
(4 24)
(5 120)
(6 720)
(7 5040)
(8 40320)
(9 362880)
(10 3628800)
NIL
==> (table (lambda (x) (* x x x)) 5 10)
(5 125)
(6 216)
(7 343)
(8 512)
(9 729)
(10 1000)
NIL
==> [ABORT]

22.2 Syntactic Extension with Macros

Scheme has a number of other special forms that were not listed above. Actually, Scheme uses the term "syntax" where we have been using "special form." The remaining syntax can be defined as "derived expressions" in terms of the five primitives. The Scheme standard does not recognize a concept of macros, but it is clear that a "derived expression" is like a macro, and we will implement them using macros. The following forms are used (nearly) identically in Scheme and Common Lisp:

let let* and or do cond case

One difference is that Scheme is less lenient as to what counts as a binding in let, let* and do. Every binding must be (var init); just (var) or var is not allowed. In do, a binding can be either (var init step) or (var init). Notice there is no do*. The other difference is in case and cond. Where Common Lisp uses the symbol t or otherwise to mark the final case, Scheme uses else. The final three syntactic extensions are unique to Scheme:

(define *var val*)      *or*          (define (*proc*-*name arg*...) *body*...)
(delay *expression*)
(letrec ((*var init*)...) *body*...)

define is a combination of defun and defparameter. In its first form, it assigns a value to a variable. Since there are no special variables in Scheme, this is no different than using set!. (There is a difference when the define is nested inside another definition, but that is not yet considered.) In the second form, it defines a function. delay is used to delay evaluation, as described in section 9.3, page 281. letrec is similar to let. The difference is that all the init forms are evaluated in an environment that includes all the vars. Thus, letrec can be used to define local recursive functions, just as labels does in Common Lisp.

The first step in implementing these syntactic extensions is to change interp to allow macros. Only one clause has to be added, but we'll repeat the whole definition:

(defun interp (x &optional env)
  "Interpret (evaluate) the expression x in the environment env."
  (cond
    ((symbolp x) (get-var x env))
    ((atom x) x)
    ((case (first x)
       (QUOTE  (second x))
       (BEGIN  (last1 (mapcar #'(lambda (y) (interp y env))
                              (rest x))))
       (SET!   (set-var! (second x) (interp (third x) env) env))
       (IF     (if (interp (second x) env)
                   (interp (third x) env)
                   (interp (fourth x) env)))
       (LAMBDA (let ((parms (second x))
                     (code (maybe-add 'begin (rest2 x))))
                 #'(lambda (&rest args)
                     (interp code (extend-env parms args env)))))
       (t      ;; a procedure application
               (apply (interp (first x) env)
                      (mapcar #'(lambda (v) (interp v env))
                              (rest x))))))))

Now we provide a mechanism for defining macros. The macro definitions can be in any convenient language; the easiest choices are Scheme itself or Common Lisp. I have chosen the latter. This makes it clear that macros are not part of Scheme itself but rather are used to implement Scheme. If we wanted to offer the macro facility to the Scheme programmer, we would make the other choice. (But then we would be sure to add the backquote notation, which is so useful in writing macros.) def-scheme-macro (which happens to be a macro itself) provides a way of adding new Scheme macros. It does that by storing a Common Lisp function on the scheme-macro property of a symbol. This function, when given a list of arguments, returns the code that the macro call should expand into. The function scheme-macro tests if a symbol has a macro attached to it, and scheme-macro-expand does the actual macro-expansion:

(defun scheme-macro (symbol)
  (and (symbolp symbol) (get symbol 'scheme-macro)))
(defmacro def-scheme-macro (name parmiist &body body)
  "Define a Scheme macro."
  '(setf (get ',name 'scheme-macro)
        #'(lambda .parmlist ..body)))
(defun scheme-macro-expand (x)
  "Macro-expand this Scheme expression."
  (if (and (listp x) (scheme-macro (first x)))
              (scheme-macro-expand
                (apply (scheme-macro (first x)) (rest x)))
              x))

Here are the definitions of nine important macros in Scheme:

(def-scheme-macro let (bindings &rest body)
  '((lambda .(mapcar #'first bindings) . ,body)
    .,(mapcar #'second bindings)))
(def-scheme-macro let* (bindings &rest body)
  (if (null bindings)
              '(begin .,body)
              '(let (,(first bindings))
          (let* ,(rest bindings) . ,body))))
(def-scheme-macro and (&rest args)
  (cond ((null args) 'T)
          ((length=1 args) (first args))
          (t '(if ,(first args)
                    (and . ,(rest args))))))
(def-scheme-macro or (&rest args)
  (cond ((null args) 'nil)
        ((length=1 args) (first args))
        (t (let ((var (gensym)))
                '(let ((,var ,(first args)))
                  (if ,var ,var (or . ,(rest args))))))))
(def-scheme-macro cond (&rest clauses)
  (cond ((null clauses) nil)
          ((length=1 (first clauses))
            '(or ,(first clauses) (cond .,(rest clauses))))
          ((starts-with (first clauses) 'else)
            '(begin .,(rest (first clauses))))
          (t '(if ,(first (first clauses))
                    (begin .,(rest (first clauses)))
                    (cond .,(rest clauses))))))
(def-scheme-macro case (key &rest clauses)
  (let ((key-val (gensym "KEY")))
    '(let ((,key-val ,key))
      (cond ,@(mapcar
                #'(lambda (clause)
                    (if (starts-with clause 'else)
                        clause
                        '((member ,key-val ',(first clause))
                                .,(rest clause))))
                clauses)))))
(def-scheme-macro define (name &rest body)
  (if (atom name)

'(begin (set! ,name . ,body) ',name)

              '(define ,(first name)
          (lambda ,(rest name) . ,body))))
(def-scheme-macro delay (computation)
  '(lambda () ,computation))
(def-scheme-macro letrec (bindings &rest body)
  '(let ,(mapcar #'(lambda (v) (list (first v) nil)) bindings)

,@(mapcar #'(lambda (v) '(set! . ,v)) bindings)

      .,body))

We can test out the macro facility:

> (scheme-macro-expand '(and p q)) => (IF P (AND Q))
> (scheme-macro-expand '(and q)) Q

> (scheme-macro-expand '(let ((x 1) (y 2)) (+ x y)))=>

((LAMBDA (X Y) (+ X Y)) 1 2)
> (scheme-macro-expand
    '(letrec

((even? (lambda (x) (or (= x 0) (odd? (- x 1)))))

(odd? (lambda (x) (even? (- x 1)))))

(even? z)))=>

(LET ((EVEN? NIL)

(ODD? NIL))

(SET! EVEN? (LAMBDA (X) (OR (= X 0) (ODD? (- X 1)))))

(SET! ODD? (LAMBDA (X) (EVEN? (- X 1))))

(EVEN? Z))

> (scheme)
==> (define (reverse 1)

` (if (null?

  1. nil`
            (append (reverse (cdr 1)) (list (car 1)))))
REVERSE
==> (reverse '(a b c d))
(D C B A)
==> (let* ((x 5) (y (+ x x)))
      (if (or (= x 0) (and (<  0 y) (< y 20)))
            (list x y)
            (+ y x)))
(5 10)

The macro define is just like set!, except that it returns the symbol rather than the value assigned to the symbol. In addition, define provides an optional syntax for defining functions-it serves the purposes of both defun and defvar. The syntax (define (fn. args).body) is an abbreviation for (definefn (lambdaargs. body)).

In addition, Scheme provides a notation where define can be used inside a function definition in a way that makes it work like let rather than set!.

The advantage of the macro-based approach to special forms is that we don't have to change the interpreter to add new special forms. The interpreter remains simple, even while the language grows. This also holds for the compiler, as we see in the next section.

22.3 A Properly Tail-Recursive Interpreter

Unfortunately, the interpreter presented above can not lay claim to the name Scheme, because a true Scheme must be properly tail-recursive. Our interpreter is tail- recursive only when run in a Common Lisp that is tail-recursive. To see the problem, consider the following Scheme procedure:

(define (traverse lyst)
  (if lyst (traverse (cdr lyst))))

Trace the function interp and execute (interp '(traverse '(a b c d))). The nested calls to interp go 16 levels deep. In general, the level of nesting is 4 plus 3 times the length of the list. Each call to interp requires Common Lisp to allocate some storage on the stack, so for very long lists, we will eventually run out of storage. To earn the name Scheme, a language must guarantee that such a program does not run out of storage.

The problem, in this example, lies in two places. Everytime we interpret an if form or a procedure call, we descend another recursive level into interp. But that extra level is not necessary. Consider the if form. It is certainly necessary to call interp recursively to decide if the test is true or not. For the sake of argument, let's say the test is true. Then we call interp again on the then part. This recursive call will return a value, which will then be immediately returned as the value of the original call as well.

The alternative is to replace the recursive call to interp with a renaming of variables, followed by a goto statement. That is, instead of calling interp and thereby binding a new instance of the variable x to the then part, we just assign the then part to x, and branch to the top of the interp routine. This works because we know we have no more use for the old value of x. A similar technique is used to eliminate the recursive call for the last expression in a begin form. (Many programmers have been taught the "structured programming" party line that goto statements are harmful. In this case, the goto is necessary to implement a low-level feature efficiently.)

The final thing we need to do is explicitly manage Scheme procedures. Instead of implementing Scheme procedures as Common Lisp closures, we will define a structure, proc, to contain the code, environment, parameter list, and optionally the name of the procedure. Then when we are evaluating a procedure call, we can assign the body of the procedure to x rather than recursively calling interp.

(defstruct (proc (:print-function print-proc))
  "Represent a Scheme procedure"
  code (env nil)(name nil) (parms nil))

The following is a properly tail-recursive interpreter. The macro prog sets up a tagbody within which we can use go statements to branch to labels, and it also sets up a block from which we can return a value. It can also bind variables like let, although in this usage, the variable list is empty. Any symbol within the body of a prog is considered a label. In this case, the label : INTERP is the target of the branch statements (GO : INTERP). I use uppercase to indicate that go-to statements are being used, but this convention has not been widely adopted.

(defun interp (x &optional env)
  "Evaluate the expression x in the environment env.
  This version is properly tail-recursive."
  (prog ()
    :INTERP
    (return
      (cond
        ((symbolp x) (get-var x env))
        ((atom x) x)
        ((scheme-macro (first x))
          (setf x (scheme-macro-expand x)) (go :INTERP))
        ((case (first x)
            (QUOTE (second x))
            (BEGIN (pop x) ; pop off the BEGIN to get at the args
                      ;; Now interpret all but the last expression
                      (loop while (rest x) do (interp (pop x) env))
                      ;; Finally, rename the last expression as x
                      (setf x (first x))
                      (GO :INTERP))

(SET! (set-var! (second x) (interp (third x) env) env))

            (IF              (setf x (if (interp (second x) env)
                                (third x)
                                (fourth x)))
                      ;; That is, rename the right expression as x
                      (GO :INTERP))
            (LAMBDA (make-proc :env env :parms (second x)
                                :code (maybe-add 'begin (rest2 x))))
            (t      ;; a procedure application
                    (let ((proc (interp (first x) env))
                          (args (mapcar #'(lambda (v) (interp v env))
                                                      (rest x))))
                      (if (proc-p proc)
                            ;; Execute procedure with rename+goto
                            (progn
                              (setf x (proc-code proc))
                              (setf env (extend-env (proc-parms proc) args
                                                                          (proc-env proc)))
                              (GO :INTERP))
                            ;; else apply primitive procedure
                            (apply proc args))))))))))
(defun print-proc (proc &optional (stream *standard-output*) depth)
  (declare (ignore depth))
  (format stream "{~a}" (or (proc-name proc) '??)))

By tracing the tail-recursive version of interp, you can see that calls to traverse descend only three recursive levels of interp, regardless of the length of the list traversed.

Note that we are not claiming that this interpreter allocates no storage when it makes tail-recursive calls. Indeed, it wastes quite a bit of storage in evaluating arguments and building environments. The claim is that since the storage is allocated on the heap rather than on the stack, it can be reclaimed by the garbage collector. So even if traverse is applied to an infinitely long list (i.e., a circular list), the interpreter will never run out of space-it will always be able to garbage-collect and continue.

There are many improvements that could be made to this interpreter, but effort is better spent in improving a compiler rather than an interpreter. The next chapter does just that.

22.4 Throw, Catch, and Call/cc

Tail-recursion is crucial to Scheme. The idea is that when the language is guaranteed to optimize tail-recursive calls, then there is no need for special forms to do iteration. All loops can be written using recursion, without any worry of overflowing the runtime stack. This helps keep the language simple and rules out the goto statement, the scourge of the structured programming movement. However, there are cases where some kind of nonlocal exit is the best alternative. Suppose that some unexpected event happens deep inside your program. The best action is to print an error message and pop back up to the top level of your program. This could be done trivially with a goto-like statement. Without it, every function along the calling path would have to be altered to accept either a valid result or an indication of the exceptional condition, which just gets passed up to the next level.

In Common Lisp, the functions throw and catch are provided for this kind of nonlocal exit. Scott Zimmerman, the perennial world Frisbee champion, is also a programmer for a Southern California firm. He once told me, "I'm starting to learn Lisp, and it must be a good language because it's got throw and catch in it." Unfortunately for Scott, throw and catch don't refer to Frisbees but to transfer of control. They are both special forms, with the following syntax:

(catch tag body...)
(throw tag value)

The first argument to catch is a tag, or label. The remaining arguments are evaluated one at a time, and the last one is returned. Thus, catch is much like progn. The difference is that if any code in the dynamic extent of the body of the catch evaluates the special form throw, then control is immediately passed to the enclosing catch with the same tag.

For example, the form

(catch 'tag
  (print 1) (throw 'tag 2) (print 3))

prints 1 and returns 2, without going on to print 3. A more representative example is:

(defun print-table (l)
  (catch 'not-a-number (mapcar #'print-sqrt-abs l)))
(defun print-sqrt-abs (x)
  (print (sqrt (abs (must-be-number x)))))
(defun must-be-number (x)
  (if (numberp x) x
      (throw 'not-a-number "huh?")))
> (print-table '(1 4 -9 x 10 20))
1
2
3
"huh?"

Here print-table calls print-sqrt-abs, which calls must-be-number. The first three times all is fine and the values 1,2,3 get printed. The next time x is not a number, so the value "huh?" gets thrown to the tag not-a-number established by catch in f. The throw bypasses the pending calls to abs, sqrt, and print, as well as the rest of the call to mapcar.

This kind of control is provided in Scheme with a very general and powerful procedure, call-with-current-continuation, which is often abbreviated call/cc. call/cc is a normal procedure (not a special form like throw and catch) that takes a single argument. Let's call the argument computation. computation must be a procedure of one argument. When call/cc is invoked, it calls computation, and whatever computation returns is the value of the call to call/cc. The trick is that the procedure computation also takes an argument (which we'll call cc) that is another procedure representing the current continuation point. If cc is applied to some value, that value is returned as the value of the call to call/cc. Here are some examples:

> (scheme)
=> (+  1 (call/cc (lambda (cc) (+  20 300))))
321

This example ignores cc and just computes (+ 1 (+ 20 300 )). More precisely, it is equivalent to:

((lambda (val) (+  1  val))
  (+  20 300))

The next example does make use of cc:

=> (+  1 (call/cc (lambda (cc) (+  20 (cc 300)))))
301

This passes 300 to cc, thus bypassing the addition of 20. It effectively throws 300 out of the computation to the catch point established by call/cc. It is equivalent to:

((lambda (val) (+  1  val))
  300)

or to:

((lambda (val) (+  1  val))
  (catch 'cc
    ((lambda (v) (+  20 v))
      (throw 'cc 300))))

Here's how the throw/catch mechanism would look in Scheme:

(define (print-table l )
  (call/cc
    (lambda (escape)

(set! not-a-number escape)

      (map print-sqrt-abs l))))
(define (print-sqrt-abs x)
  (write (sqrt (abs (must-be-number x)))))
(define (must-be-number x)
  (if (numberp x) x
      (not-a-number "huh?")))
(define (map fn l)

(if (null? l)

      '()
      (cons (fn (first l))
              (map fn (rest 1)))))

The ability to return to a pending point in the computation is useful for this kind of error and interrupt handling. However, the truly amazing, wonderful thing about call/cc is the ability to return to a continuation point more than once. Consider a slight variation:

=> (+  1 (call/cc (lambda (cc)

(set! old-cc cc)

                      (+  20 (cc 300)))))
301
=> (old-cc 500)
501

Here, we first computed 301, just as before, but along the way saved cc in the global variable old-cc. Afterward, calling (old-cc 500) returns (for the second time) to the point in the computation where 1 is added, this time returning 501. The equivalent Common Lisp code leads to an error:

> (+  1 (catch 'tag (+  20 (throw 'tag 300))))
301
> (throw 'tag 500)
*Error*: *there was no pending CATCH for the tag TAG*

In other words, call/cc's continuations have indefinite extent, while throw/catch tags only have dynamic extent.

We can use cal1/cc to implement automatic backtracking (among other things). Suppose we had a special form, amb, the "ambiguous" operator, which returns one of its arguments, chosen at random. We could write:

(define (integer) (amb 1 (+  1 (integer))))

and a call to integer would return some random positive integer. In addition, suppose we had a function, fail, which doesn't return at all but instead causes execution to continue at a prior amb point, with the other choice taken. Then we could write succinct2 backtracking code like the following:

(define (prime)
  (let ((n (integer)))

(if (prime? n) n (fail))))

If prime? is a predicate that returns true only when its argument is a prime number, then prime will always return some prime number, decided by generating random integers. While this looks like a major change to the language-adding backtracking and nondeterminism-it turns out that amb and fail can be implemented quite easily with cal1/cc. First, we need to make amb be a macro:

(def-scheme-macro amb (x y)
  '(random-choice (lambda () ,x) (lambda () ,y))))

The rest is pure Scheme. We maintain a list of backtrack-points, which are implemented as functions of no arguments. To backtrack, we just call one of these functions. That is what fail does. The function choose-first takes two functions and pushes the second, along with the proper continuation, on backtrack-points, and then calls the first, returning that value. The function random-choice is what amb expands into: it decides which choice is first, and which is second. (Note that the convention in Scheme is to write global variables like backtrack-points without asterisks.)

(define backtrack-points nil)
(define (fail)
  (let ((last-choice (car backtrack-points)))

(set! backtrack-points (cdr backtrack-points))

    (last-choice)))
(define (random-choice f g)
  (if (=  1 (random 2))
      (choose-first f g)
      (choose-first g f)))
(define (choose-first f g)
  (call/cc
    (lambda (k)

(set! backtrack-points

            (cons (lambda () (k (g))) backtrack-points))
      (f))))

This implements chronological backtracking, as in Prolog. However, we actually have the freedom to do other kinds of backtracking as well. Instead of having fail take the first element of backtrack-points, we could choose a random element instead. Or, we could do some more complex analysis to choose a good backtrack point.

call/cc can be used to implement a variety of control structures. As another example, many Lisp implementations provide a reset function that aborts the current computation and returns control to the top-level read-eval-print loop. reset can be defined quite easily using call/cc. The trick is to capture a continuation that is at the top level and save it away for future use. The following expression, evaluated at the top level, saves the appropriate continuation in the value of reset:

(call/cc (lambda (cc) (set! reset (lambda ()

                                (cc "Back to top level")))))

Exercise 22.2 [m] Can you implement call/cc in Common Lisp?

Exercise 22.3 [s] Can you implement amb and fail in Common Lisp?

Exercise 22.4 [m]fail could be written

(define (fail) ((pop backtrack-points))) if we had the pop macro in Scheme.

Write pop.

22.5 An Interpreter Supporting Call/cc

It is interesting that the more a host language has to offer, the easier it is to write an interpreter. Perhaps the hardest part of writing a Lisp interpreter (or compiler) is garbage collection. By writing our interpreter in Lisp, we bypassed the problem all together-the host language automatically collects garbage. Similarly, if we are using a Common Lisp that is properly tail-recursive, then our interpreter will be too, without taking any special steps. If not, the interpreter must be rewritten to take care of tail-recursion, as we have seen above.

It is the same with call/cc. If our host language provides continuations with indefinite extent, then it is trivial to implement call/cc. If not, we have to rewrite the whole interpreter, so that it explicitly handles continuations. The best way to do this is to make interp a function of three arguments: an expression, an environment, and a continuation. That means the top level will have to change too. Rather than having interp return a value that gets printed, we just pass it the function print as a continuation:

(defun scheme ()
    "A Scheme read-eval-print loop (using interp).
    Handles call/cc by explicitly passing continuations."
    (init-scheme-interp)
    (loop (format t "~&==> ")
              (interp (read) nil #'print)))

Now we are ready to tackle interp. For clarity, we will base it on the non-tail-recursive version. The cases for symbols, atoms, macros, and quote are almost the same as before. The difference is that the result of each computation gets passed to the continuation, cc, rather than just being returned.

The other cases are all more complex, because they all require explicit representation of continuations. That means that calls to interp cannot be nested. Instead, we call interp with a continuation that includes another call to interp. For example, to interpret (if p x y), we first call interp on the second element of the form, the predicate p. The continuation for this call is a function that tests the value of p and interprets either x or y accordingly, using the original continuation for the recursive call to interp. The other cases are similar. One important change is that Scheme procedures are implemented as Lisp functions where the first argument is the continuation:

(defun interp (x env cc)
  "Evaluate the expression x in the environment env,
  and pass the result to the continuation cc."
  (cond
    ((symbolp x) (funcall cc (get-var x env)))
    ((atom x) (funcall cc x))
    ((scheme-macro (first x))
      (interp (scheme-macro-expand x) env cc))
    ((case (first x)
          (QUOTE (funcall cc (second x)))
          (BEGIN (interp-begin (rest x) env cc))
(SET!    (interp (third x) env
                    #'(lambda (val)

(funcall cc (set-var! (second x)

                                                                        val env)))))
(IF      (interp (second x) env
                    #'(lambda (pred)
                          (interp (if pred (third x) (fourth x))
                                env cc))))
(LAMBDA (let ((parms (second x))
                  (code (maybe-add 'begin (rest2 x))))
              (funcall
                cc
                #'(lambda (cont &rest args)
                    (interp code
                              (extend-env parms args env)
                              cont)))))
(t      (interp-call x env cc))))))

A few auxiliary functions are defined, in the same continuation-passing style:

(defun interp-begin (body env cc)
  "Interpret each element of BODY, passing the last to CC."
  (interp (first body) env
          #'(lambda (val)
              (if (null (rest body))
                      (funcall cc val)
                      (interp-begin (rest body) env cc)))))
(defun interp-call (call env cc)
  "Interpret the call (f x...) and pass the result to CC."
  (map-interp call env
                  #'(lambda (fn-and-args)
                      (apply (first fn-and-args)
                                cc
                                (rest fn-and-args)))))
(defun map-interp (list env cc)
  "Interpret each element of LIST, and pass the list to CC."
  (if (null list)
        (funcall cc nil)
        (interp (first list) env
                  #'(lambda (x)
                      (map-interp (rest list) env
                                #'(lambda (y)
                                (funcall cc (cons x y))))))))

Because Scheme procedures expect a continuation as the first argument, we need to redefine init-scheme-proc to install procedures that accept and apply the continuation:

(defun init-scheme-proc (f)
  "Define a Scheme procedure as a corresponding CL function."
  (if (listp f)
      (set-global-var! (first f) (symbol-function (second f)))
      (set-global-var! f (symbol-function f))))

We also need to define call/cc. Think for a moment about what call/cc must do. Like all Scheme procedures, it takes the current continuation as its first argument. The second argument is a procedure-a computation to be performed. call/cc performs the computation by calling the procedure. This is just a normal call, so it uses the current continuation. The tricky part is what call/cc passes the computation as its argument. It passes an escape procedure, which can be invoked to return to the same point that the original call to call/cc would have returned to. Once the working of call/cc is understood, the implementation is obvious:

(defun call/cc (cc computation)
  "Make the continuation accessible to a Scheme procedure."
  (funcall computation cc
           ;; Package up CC into a Scheme function:
           #'(lambda (cont val)
               (declare (ignore cont))
               (funcall cc val))))

;; Now install call/cc in the global environment
(set-global-var! 'call/cc #'call/cc)
(set-global-var! 'call-with-current-continuation #'call/cc)

22.6 History and References

Lisp interpreters and AI have a long history together. MIT AI Lab Memo No. 1 (McCarthy 1958) was the first paper on Lisp. McCarthy's students were working on a Lisp compiler, had written certain routines-read, print, etc.-in assembly language, and were trying to develop a full Lisp interpreter in assembler. Sometime around the end of 1958, McCarthy wrote a theoretical paper showing that Lisp was powerful enough to write the universal function, eval. A programmer on the project, Steve Russell, saw the paper, and, according to McCarthy:

Steve Russell said, look, why don't I program this eval and-you remember the interpreter-and I said to him, ho, ho, you're confusing theory with practice, this eval is intended for reading not for computing. But he went ahead and did it. That is, he compiled the eval in my paper into 704 machine code fixing bugs and then advertised this as a Lisp interpreter, which it certainly was.3

So the first Lisp interpreter was the result of a programmer ignoring his boss's advice. The first compiler was for the Lisp 1.5 system (McCarthy et al. 1962). The compiler was written in Lisp; it was probably the first compiler written in its own language.

Allen's Anatomy of lisp (1978) was one of the first overviews of Lisp implementation techniques, and it remains one of the best. However, it concentrates on the dynamic-scoping Lisp dialects that were in use at the time. The more modern view of a lexically scoped Lisp was documented in an influential pair of papers by Guy Steele (1976a,b). His papers "Lambda: the ultimate goto" and "Compiler optimization based on viewing lambda as rename plus goto" describe properly tail-recursive interpreters and compilers.

The Scheme dialect was invented by Gerald Sussman and Guy Steele around 1975 (see their MIT AI Memo 349). The Revised4Report on the Algorithmic Language Scheme (Clinger et al. 1991) is the definitive reference manual for the current version of Scheme.

Abelson and Sussman (1985) is probably the best introduction to computer science ever written. It may or may not be a coincidence that it uses Scheme as the programming language. It includes a Scheme interpreter. Winston and Horn's Lisp (1989) also develops a Lisp interpreter.

The amb operator for nondeterministic choice was proposed by John McCarthy (1963) and used in SCHEMER (Zabih et al. 1987), a nondeterministic Lisp. Ruf and Weise (1990) present another implementation of backtracking in Scheme that incorporates all of logic programming.

22.7 Exercises

Exercise 22.5 [m] While Scheme does not provide full-blown support for optional and keyword arguments, it does support rest parameters. Modify the interpreter to support the Scheme syntax for rest parameters:

Scheme Common Lisp
(lambda xbody) (lambda (&rest x) body)
(lambda (x y . z)body) (lambda (x y &rest z) body)

Exercise 22.6 [h] The representation of environments is somewhat wasteful. Currently it takes 3n cons cells to represent an environment with n variables. Change the representation to take less space.

Exercise 22.7 [m] As we've implemented macros, they need to be expanded each time they are encountered. This is not so bad for the compiler-you expand the source code and compile it, and then never refer to the source code again. But for the interpreter, this treatment of macros is most unsatisfactory: the work of macroexpansion must be done again and again. How can you eliminate this duplicated effort?

Exercise 22.8 [m] It turns out Scheme allows some additional syntax in let and cond. First, there is the "named-let" expression, which binds initial values for variables but also defines a local function that can be called within the body of the let. Second, cond recognizes the symbol => when it is the second element of a cond clause, and treats it as a directive to pass the value of the test (when it is not false) to the third element of the clause, which must be a function of one argument. Here are two examples:

(define (fact n)
  ;; Iterative factorial; does not grow the stack
  (let loop ((result 1) (i n))
    (if (= i 0) result (loop (* result i) (- i 1)))))
(define (lookup key alist)
  ;; Find key's value in alist
  (cond ((assoc key alist) => cdr)
          (else #f)))

These are equivalent to:

(define (fact n)
  (letrec
    ((loop (lambda (result i)
                (if (= i 0)
                    result
                    (loop (* result i) (- i 1))))))
    (loop 1 n)))
(define (lookup key alist)
  (let ((g0030 (assoc key alist)))
    (if g0030
        (cdr g0030)
        #f)))

Write macro definitions for let and cond allowing these variations.

Exercise 22.9 [h] Some Scheme implementations permit define statements inside the body of a lambda (and thus of a define, let, let*, or letrec as well). Here is an example:

(define (length l)
  (define (len l n)

(if (null? l) n (len (cdr l) (+ n 1))))

  (len l 0))

The internal definition of len is interpreted not as defining a global name but rather as defining a local name as if with letrec. The above definition is equivalent to:

(define (length l)
  (letrec ((len (lambda (l n)

(if (null? l) n (len (cdr l) (+ n 1))))))

    (len l 0)))

Make changes to the interpreter to allow this kind of internal definition.

Exercise 22.10 Scheme programmers are often disdainful of the function or #' notation in Common Lisp. Is it possible (without changing the compiler) to make Common Lisp accept (lambda ( ) ... ) instead of # ' (lambda ( ) ... ) and fn instead of #'fn?

Exercise 22.11 [m] The top level of the continuation-passing version of scheme includes the call: (interp (read)``nil #'print). Will this always result in some value being printed? Or is it possible that the expression read might call some escape function that ignores the value without printing anything?

Exercise 22.12 [h] What would have to be added or changed to turn the Scheme interpreter into a Common Lisp interpreter?

Exercise 22.13 [h] How would you change the interpreter to allow for multiple values? Explain how this would be done both for the first version of the interpreter and for the continuation-passing version.

22.8 Answers

Answer 22.2 There is no way to implement a full call/cc to Common Lisp, but the following works for cases where the continuation is only used with dynamic extent:

(defun call/cc (cc computation)
  "Make the continuation accessible to a Scheme procedure."
  (funcall computation cc
           ;; Package up CC into a Scheme function:
           #'(lambda (cont val)
               (declare (ignore cont))
               (funcall cc val))))

Answer 22.3 No. fail requires continuations with dynamic extent.

Answer 22.5 We need only modify extend - env to know about an atomic vars list. While we're at it, we might as well add some error checking:

(defun extend-env (vars vals env)
  "Add some variables and values to an environment."
  (cond ((null vars)
          (assert (null vals) ( ) "Too many arguments supplied")
          env)
          ((atom vars)
            (cons (list vars vals) env))
          (t (assert (rest vals) ( ) "Too few arguments supplied")
              (cons (list (first vars) (first vals))
                      (extend-env (rest vars) (rest vals) env)))))

Answer 22.6 Storing the environment as an association list, ((*var val*)...), makes it easy to look up variables with assoc. We could save one cons cell per variable just by changing to ((*var* . *val*)...). But even better is to switch to a different representation, one presented by Steele and Sussman in The Art of the Interpreter (1978). In this representation we switch from a single list of var/val pairs to a list of frames, where each frame is a var-list/val-list pair. It looks like this:

(((*var*...) . (*val*...))
  ((*var*...) . (*val*...))
...)

Now extend-env is trivial:

(defun extend-env (vars vals env)
  "Add some variables and values to an environment."
  (nconc (mapcar #'list vars vals) env))

The advantage of this approach is that in most cases we already have a list of variables (the procedure's parameter list) and values (from the mapcar of interp over the arguments). So it is cheaper to just cons these two lists together, rather than arranging them into pairs. Of course, get-var and set-var! become more complex.

Answer 22.7 One answer is to destructively alter the source code as it is macro-expanded, so that the next time the source code is interpreted, it will already be expanded. The following code takes care of that:

(defun scheme-macro-expand (x)
  (displace x (apply (scheme-macro (first x)) (rest x))))
(defun displace (old new)
  "Destructively change old cons-cell to new value."
  (if (consp new)
        (progn (setf (car old) (car new))
                      (setf (cdr old) (cdr new))
                      old)
        (displace old '(begin ,new))))

One drawback to this approach is that the user's source code is actually changed, which may make debugging confusing. An alternative is to expand into something that keeps both the original and macro-expanded code around:

(defun displace (old new)
  "Destructively change old to a DISPLACED structure."
  (setf (car old) 'DISPLACED)
  (setf (cdr old) (list new old))
  old)

This means that DISPLACED is a new special form, and we need a clause for it in the interpreter. It would look something like this:

(case (first x)
  ...
  (DISPLACED (interp (second x) env))
  ...

We'd also need to modify the printing routines to print just old whenever they see (displaced old new).

Answer 22.8

(def-scheme-macro let (vars &rest body)
  (if (symbolp vars)
        ;; named let
        (let ((f vars) (vars (first body)) (body (rest body)))
          '(letrec ((,f (lambda ,(mapcar #'first vars) .,body)))
                (,f .,(mapcar #'second vars))))
        ;; "regular" let
        '((lambda ,(mapcar #'first vars) . ,body)

. ,(mapcar #'second vars)))))

(def-scheme-macro cond (&rest clauses)
  (cond ((null clauses) nil)
        ((length=1 (first clauses))
         `(or ,(first clauses) (cond .,(rest clauses))))
        ((starts-with (first clauses) 'else)
         `(begin .,(rest (first clauses))))
        ((eq (second (first clauses)) '=>)
            (assert (= (length (first clauses)) 3))
            (let ((var (gensym)))
            '(let ((,var ,(first (first clauses))))
                (if ,var (,(third (first clauses)) ,var)
                          (cond .,(rest clauses))))))
        (t `(if ,(first (first clauses))
                (begin .,(rest (first clauses)))
                (cond .,(rest clauses))))))

Answer 22.10 It is easy to define lambda as a macro, eliminating the need for #'(lambda ...):

(defmacro lambda (args &rest body)
  '(function (lambda .args .@body)))

If this were part of the Common Lisp standard, I would gladly use it. But because it is not, I have avoided it, on the grounds that it can be confusing.

It is also possible to write a new function-defining macro that would do the following type of expansion:

(defn double (x) (* 2 x)) =>
(defparameter double (defun double (x) (* 2 x)))

This makes double a special variable, so we can write double instead of #'double. But this approach is not recommended-it is dangerous to define special variables that violate the asterisk convention, and the Common Lisp compiler may not be able to optimize special variable references the way it can function special forms. Also, this approach would not interact properly with flet and labels.


1 One writes numberp because there is no hyphen in number but random-state-p because there is a hyphen in random-state. However, defstruct concatenates -p in all its predicates, regardless of the presence of a hyphen in the structure's name. !!!(p) {:.ftnote1}

2 although inefficient !!!(p) {:.ftnote1}

3 McCarthy's words from a talk on the history of Lisp, 1974, recorded by Stoyan (1984). !!!(p) {:.ftnote1}