;; Simple interpreter of section 3.5 -- ;; simplified from online code 3-5.scm ;;;;;;;;;;;;;;;; top level and tests ;;;;;;;;;;;;;;;; (define run (lambda (string) (eval-program (scan&parse string)))) ;;;;;;;;;;;;;;;; grammatical specification ;;;;;;;;;;;;;;;; (define the-lexical-spec '((whitespace (whitespace) skip) (comment ("%" (arbno (not #\newline))) skip) (identifier (letter (arbno (or letter digit "_" "-" "?"))) symbol) (number (digit (arbno digit)) number))) (define the-grammar '((program (expression) a-program) (expression (number) lit-exp) (expression (identifier) var-exp) (expression (primitive "(" (separated-list expression ",") ")") primapp-exp) (expression ("if" expression "then" expression "else" expression) if-exp) (expression ("let" (arbno identifier "=" expression) "in" expression) let-exp) (expression ("proc" "(" (separated-list identifier ",") ")" expression) proc-exp) (expression ("(" expression (arbno expression) ")") app-exp) (primitive ("+") add-prim) (primitive ("-") subtract-prim) (primitive ("*") mult-prim) (primitive ("add1") incr-prim) (primitive ("sub1") decr-prim) )) (sllgen:make-define-datatypes the-lexical-spec the-grammar) (define show-the-datatypes (lambda () (sllgen:list-define-datatypes the-lexical-spec the-grammar))) (define scan&parse (sllgen:make-string-parser the-lexical-spec the-grammar)) (define just-scan (sllgen:make-string-scanner the-lexical-spec the-grammar)) (define read-eval-print (sllgen:make-rep-loop "--> " (lambda (pgm) (eval-program pgm)) ; wrapped to avoid load ; dependency (sllgen:make-stream-parser the-lexical-spec the-grammar))) ;;;;;;;;;;;;;;;; the interpreter ;;;;;;;;;;;;;;;; (define eval-program (lambda (pgm) (cases program pgm (a-program (body) (eval-expression body (init-env)))))) (define eval-expression (lambda (exp env) (cases expression exp (lit-exp (datum) datum) (var-exp (id) (apply-env env id)) (primapp-exp (prim rands) (let ((args (eval-rands rands env))) (apply-primitive prim args))) (if-exp (test-exp true-exp false-exp) ;\new4 (if (true-value? (eval-expression test-exp env)) (eval-expression true-exp env) (eval-expression false-exp env))) (let-exp (ids rands body) ;\new3 (eval-expression body (extend-env ids (eval-rands rands env) env))) (proc-exp (ids body) (closure ids body env)) (app-exp (rator rands) (apply-procval (eval-expression rator env) (eval-rands rands env))) ))) (define eval-rands (lambda (rands env) (map (lambda (x) (eval-rand x env)) rands))) (define eval-rand (lambda (rand env) (eval-expression rand env))) ;; alternative definition: (cvarela 2003/09/25) (define eval-rand eval-expression) (define apply-primitive (lambda (prim args) (cases primitive prim (add-prim () (+ (car args) (cadr args))) (subtract-prim () (- (car args) (cadr args))) (mult-prim () (* (car args) (cadr args))) (incr-prim () (+ (car args) 1)) (decr-prim () (- (car args) 1)) ))) ;; alternative definition allowing a variable number of arguments for ;; primitive operators: (gunduz 2003/09/29) (define apply-primitive (lambda (prim args) (cases primitive prim (add-prim () (apply + args)) (subtract-prim () (apply - args)) (mult-prim () (apply * args)) (incr-prim () (+ (car args) 1)) (decr-prim () (- (car args) 1)) ))) (define init-env (lambda () (extend-env '(i v x) '(1 5 10) (empty-env)))) ;;;;;;;;;;;;;;;; booleans ;;;;;;;;;;;;;;;; (define true-value? (lambda (x) (not (zero? x)))) ;; Exercise: redefine your language semantics so that expressions by ;; default are false, rather than true. ;; Possibility 1: Assuming 1 is true and everything else is false (define true-value? (lambda (x) (zero? (- x 1)))) ;; Possibility 2: Assuming 0 is true and everything else is false (define true-value? (lambda (x) (zero? x))) ;; But, let us go back to the standard semantics of 0==false and ;; everything else true: (define true-value? (lambda (x) (not (zero? x)))) ;;;;;;;;;;;;;;;; environments ;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;;; ;;;;;;;;;;;;;;;; rib-cage data type representation ;;;;;; (define-datatype environment environment? (empty-env-record) (extended-env-record (syms (list-of symbol?)) (vec vector?) ; can use this for anything. (env environment?)) ) (define empty-env (lambda () (empty-env-record))) (define extend-env (lambda (syms vals env) (extended-env-record syms (list->vector vals) env))) (define apply-env (lambda (env sym) (cases environment env (empty-env-record () (eopl:error 'apply-env "No binding for ~s" sym)) (extended-env-record (syms vals env) (let ((position (rib-find-position sym syms))) (if (number? position) (vector-ref vals position) (apply-env env sym))))))) (define rib-find-position (lambda (sym los) (list-find-position sym los))) (define list-find-position (lambda (sym los) (list-index (lambda (sym1) (eqv? sym1 sym)) los))) (define list-index (lambda (pred ls) (cond ((null? ls) #f) ((pred (car ls)) 0) (else (let ((list-index-r (list-index pred (cdr ls)))) (if (number? list-index-r) (+ list-index-r 1) #f)))))) ;;;;;;;;;;;;;;;;;;;;; Procedure Values ;;;;;;;;;;;;;;;;;;;;;;; ;;;;;;;;;;;;;; Procedural Representation ;;;;;;;;;;;;;;;;; (define closure (lambda (ids body env) (lambda (args) (eval-expression body (extend-env ids args env))))) (define apply-procval (lambda (proc args) (if (not (procedure? proc)) (eopl:error 'apply-procval "Attempt to apply non-procedure ~s" proc) (proc args)))) ;; e.g., in defined language: (run " (proc (x,y) +(x,y) 2 5) ") (run " let f = proc (y,z) +(y,-(z,5)) in (f 2 28) ") (run " let curry = proc (f) proc (x) proc (y) (f x y) plus = proc (x,y) +(x,y) in (((curry plus) 2) 3) ") (run " let a = 3 in let p = proc (x) +(x,a) a = 5 in *(a,(p 2)) ") (run " let makemult = proc (maker,x) if x then +(4,(maker maker sub1(x))) else 0 in let times4 = proc (x) (makemult makemult x) in (times4 3) ") ;; Exercise 3.21 (run " let fact = proc (maker,x) if x then *(x,(maker maker sub1(x))) else 1 in let factorial = proc (x) (fact fact x) in (factorial 3) ") ;; Exercise 3.22 (run " let evenR = proc(even1,odd1,x) if x then (odd1 odd1 even1 sub1(x)) else 1 oddR = proc(odd1,even1,x) if x then (even1 even1 odd1 sub1(x)) else 0 in let even =proc(x) (evenR evenR oddR x) odd = proc(x) (oddR oddR evenR x) in (even 6) ")