;;;; ;;;; Prekode til innlevering 2a i INF2810 (V17): Prosedyrer for å jobbe med ;;;; Huffman-trær, fra SICP, Seksjon 2.3.4. ;;;; ;;; Merk at koden under gjør bruk av diverse innebygde kortformer for ;;; kjeder av car og cdr. F.eks er (cadr x) det samme som (car (cdr x)), ;;; og (caadr x) tilsvarer (car (car (cdr x))), osv. ;;; ;;; Abstraksjonsbarriere: ;;; (define (make-leaf symbol weight) (list 'leaf symbol weight)) (define (leaf? object) (eq? (car object) 'leaf)) (define (symbol-leaf x) (cadr x)) (define (weight-leaf x) (caddr x)) (define (make-code-tree left right) (list left right (append (symbols left) (symbols right)) (+ (weight left) (weight right)))) (define (left-branch tree) (car tree)) (define (right-branch tree) (cadr tree)) (define (symbols tree) (if (leaf? tree) (list (symbol-leaf tree)) (caddr tree))) (define (weight tree) (if (leaf? tree) (weight-leaf tree) (cadddr tree))) ;;; ;;; Dekoding: ;;; (define (decode bits tree) (define (decode-1 bits current-branch) (if (null? bits) '() (let ((next-branch (choose-branch (car bits) current-branch))) (if (leaf? next-branch) (cons (symbol-leaf next-branch) (decode-1 (cdr bits) tree)) (decode-1 (cdr bits) next-branch))))) (decode-1 bits tree)) (define (choose-branch bit branch) (if (= bit 0) (left-branch branch) (right-branch branch))) ;;; ;;; Sortering av node-lister: ;;; (define (adjoin-set x set) (cond ((null? set) (list x)) ((< (weight x) (weight (car set))) (cons x set)) (else (cons (car set) (adjoin-set x (cdr set)))))) (define (make-leaf-set pairs) (if (null? pairs) '() (let ((pair (car pairs))) (adjoin-set (make-leaf (car pair) (cadr pair)) (make-leaf-set (cdr pairs)))))) ;;; ;;; Diverse test-data: ;;; (define sample-tree (make-code-tree (make-leaf 'ninjas 8) (make-code-tree (make-leaf 'fight 5) (make-code-tree (make-leaf 'night 1) (make-leaf 'by 1))))) (define sample-code '(0 1 0 0 1 1 1 1 1 0))