(module red-black-tree-set mzscheme
(require (all-except (lib "list.ss") empty empty? remove remove* filter)
(lib "match.ss")
(lib "67.ss" "srfi")
(lib "42.ss" "srfi"))
(require (prefix raw- "private/raw-red-black-tree-set.scm"))
(define-struct Set (compare raw))
(define (raw s) (Set-raw s))
(define (compare s) (Set-compare s))
(define (set? o)
(Set? o))
(define (same-compare? s1 s2)
(eq? (Set-compare s1) (Set-compare s2)))
(define empty
(case-lambda
[() (empty (current-compare))]
[(cmp) (make-Set cmp raw-empty)]))
(define (empty? s)
(raw-empty? (raw s)))
(define singleton
(case-lambda
[(x) (singleton (current-compare) x)]
[(cmp x) (make-Set cmp (raw-singleton x))]))
(define (member? x s)
(raw-member? (compare s) x (raw s)))
(define (get x s)
(raw-get (compare s) x (raw s)))
(define (insert x s)
(make-Set (compare s)
(raw-insert (compare s) x (raw s))))
(define (insert/combiner x s combine)
(make-Set (compare s)
(raw-insert/combiner (compare s) x (raw s) combine)))
(define (insert* xs s)
(make-Set (compare s)
(raw-insert* (compare s) xs (raw s))))
(define (insert*/combiner xs s combine)
(make-Set (compare s)
(raw-insert*/combiner (compare s) xs (raw s) combine)))
(define (delete x s)
(make-Set (compare s)
(raw-remove (compare s) x (raw s))))
(define (delete-all x s)
(delete x s))
(define (delete-min s)
(delete (find-min s) s))
(define (delete* xs s)
(make-Set (compare s)
(raw-remove* (compare s) xs (raw s))))
(define (find-min s)
(when (empty? s)
(error 'find-min "an empty set does not have a minimum element"))
(raw-find-min (raw s)))
(define (fold f init s)
(raw-fold f init (raw s)))
(define (set . xs)
(list->set (current-compare) xs))
(define list->set
(case-lambda
[(xs) (list->set (current-compare) xs)]
[(cmp xs) (make-Set cmp (raw-list->set cmp xs))]))
(define list->set/combiner
(case-lambda
[(xs combine) (list->set/combiner (current-compare) xs combine)]
[(cmp xs combine) (make-Set cmp (raw-list->set/combiner cmp xs combine))]))
(define (elements s)
(raw-elements (raw s)))
(define (select s)
(if (empty? s)
(error 'select "can't select an element from an empty set")
(raw-select (raw s))))
(define (size s)
(raw-size (raw s)))
(define-syntax (define-binary-operation stx)
(syntax-case stx ()
[(define-binary-operation name raw-name finish)
#'(define name
(case-lambda
[(s1 s2)
(name (Set-compare s1) s1 s2)]
[(cmp s1 s2)
(finish cmp (raw-name cmp (raw s1) (raw s2)))]))]))
(define-binary-operation union raw-union make-Set)
(define-binary-operation intersection raw-intersection make-Set)
(define-binary-operation difference raw-difference make-Set)
(define-binary-operation subset? raw-subset? (lambda (cmp b) b))
(define-binary-operation equal=? raw-equal=? (lambda (cmp b) b))
(define union/combiner
(case-lambda
[(s1 s2 combine)
(union/combiner (Set-compare s1) s1 s2 combine)]
[(cmp s1 s2 combine)
(make-Set cmp (raw-union/combiner cmp (raw s1) (raw s2) combine))]))
(define intersection/combiner
(case-lambda
[(s1 s2 combine)
(intersection/combiner (Set-compare s1) s1 s2 combine)]
[(cmp s1 s2 combine)
(make-Set cmp (raw-intersection/combiner cmp (raw s1) (raw s2) combine))]))
(define (insert/combiner2 x s combine)
(let ([cmp (Set-compare s)])
(make-Set cmp (raw-insert/combiner cmp x (raw s) combine))))
(define (insert*/combiner2 xs s combine)
(let ([cmp (Set-compare s)])
(make-Set cmp (raw-insert*/combiner cmp xs (raw s) combine))))
(define-syntax set-ec
(syntax-rules ()
[(_c cmp etc1 etc ...)
(fold-ec (empty cmp) etc1 etc ... insert)]))
(define-syntax :set
(syntax-rules (index)
((:set cc var (index i) arg)
(:parallel cc (:stack var arg) (:integers i)) )
((:set cc var arg)
(:do cc
(let ())
((t (raw arg))
(c (compare arg)))
(not (null? t))
(let ((var (raw-select t))))
#t
((raw-remove c var t)
c) ))))
(define (:set-dispatch args)
(cond
[(null? args)
'set]
[(and (= (length args) 1)
(set? (car args)))
(:generator-proc (:set (car args)))]
[else
#f]))
(:-dispatch-set!
(dispatch-union (:-dispatch-ref) :set-dispatch))
(require "signatures/set-signature.scm")
(provide-set)
)
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