-1. Complete the definitions of `move_botleft` and `move_right_or_up` from the same-fringe solution in the [[week11]] notes. Test your attempts against some example trees to see if the resulting `make_fringe_enumerator` and `same_fringe` functions work as expected.
-
- type 'a tree = Leaf of 'a | Node of ('a tree * 'a tree)
-
- type 'a starred_tree = Root | Starring_Left of 'a starred_pair | Starring_Right of 'a starred_pair
- and 'a starred_pair = { parent : 'a starred_tree; sibling: 'a tree }
- and 'a zipper = { tree : 'a starred_tree; filler: 'a tree };;
-
- let rec move_botleft (z : 'a zipper) : 'a zipper =
- (* returns z if the targetted node in z has no children *)
- (* else returns move_botleft (zipper which results from moving down and left in z) *)
- YOU SUPPLY THE DEFINITION
-
-
- let rec move_right_or_up (z : 'a zipper) : 'a zipper option =
- (* if it's possible to move right in z, returns Some (the result of doing so) *)
- (* else if it's not possible to move any further up in z, returns None *)
- (* else returns move_right_or_up (result of moving up in z) *)
- YOU SUPPLY THE DEFINITION
-
-
- let new_zipper (t : 'a tree) : 'a zipper =
- {tree = Root; filler = t}
- ;;
-
- let make_fringe_enumerator (t: 'a tree) =
- (* create a zipper targetting the root of t *)
- let zstart = new_zipper t
- in let zbotleft = move_botleft zstart
- (* create a refcell initially pointing to zbotleft *)
- in let zcell = ref (Some zbotleft)
- (* construct the next_leaf function *)
- in let next_leaf () : 'a option =
- match !zcell with
- | None -> (* we've finished enumerating the fringe *)
- None
- | Some z -> (
- (* extract label of currently-targetted leaf *)
- let Leaf current = z.filler
- (* update zcell to point to next leaf, if there is one *)
- in let () = zcell := match move_right_or_up z with
- | None -> None
- | Some z' -> Some (move_botleft z')
- (* return saved label *)
- in Some current
- )
- (* return the next_leaf function *)
- in next_leaf
- ;;
-
- let same_fringe (t1 : 'a tree) (t2 : 'a tree) : bool =
- let next1 = make_fringe_enumerator t1
- in let next2 = make_fringe_enumerator t2
- in let rec loop () : bool =
- match next1 (), next2 () with
- | Some a, Some b when a = b -> loop ()
- | None, None -> true
- | _ -> false
- in loop ()
- ;;
-
-
-2. Here's another implementation of the same-fringe function, in Scheme. It's taken from <http://c2.com/cgi/wiki?SameFringeProblem>. It uses thunks to delay the evaluation of code that computes the tail of a list of a tree's fringe. It also involves passing continuations as arguments. Your assignment is to supply comments to the code, to explain what every significant piece is doing.
-
- This code uses Scheme's `cond` construct. That works like this;
-
- (cond
- ((test1 argument argument) result1)
- ((test2 argument argument) result2)
- ((test3 argument argument) result3)
- (else result4))
-
- is equivalent to:
-
- (if (test1 argument argument)
- ; then
- result1
- ; else
- (if (test2 argument argument)
- ; then
- result2
- ; else
- (if (test3 argument argument)
- ; then
- result3
- ; else
- result4)))
-
- Some other Scheme details:
-
- * `#t` is true and `#f` is false
- * `(lambda () ...)` constructs a thunk
- * there is no difference in meaning between `[...]` and `(...)`; we just sometimes use the square brackets for clarity
- * `'(1 . 2)` and `(cons 1 2)` are pairs (the same pair)
- * `(list)` and `'()` both evaluate to the empty list
- * `(null? lst)` tests whether `lst` is the empty list
- * non-empty lists are implemented as pairs whose second member is a list
- * `'()` `'(1)` `'(1 2)` `'(1 2 3)` are all lists
- * `(list)` `(list 1)` `(list 1 2)` `(list 1 2 3)` are the same lists as the preceding
- * `'(1 2 3)` and `(cons 1 '(2 3))` are both pairs and lists (the same list)
- * `(pair? lst)` tests whether `lst` is a pair; if `lst` is a non-empty list, it will also pass this test; if `lst` fails this test, it may be because `lst` is the empty list, or because it's not a list or pair at all
- * `(car lst)` extracts the first member of a pair / head of a list
- * `(cdr lst)` extracts the second member of a pair / tail of a list
-
- Here is the implementation:
-
- (define (lazy-flatten tree)
- (letrec ([helper (lambda (tree tailk)
- (cond
- [(pair? tree)
- (helper (car tree) (lambda () (helper (cdr tree) tailk)))]
- [else (cons tree tailk)]))])
- (helper tree (lambda () (list)))))
-
- (define (stream-equal? stream1 stream2)
- (cond
- [(and (null? stream1) (null? stream2)) #t]
- [(and (pair? stream1) (pair? stream2))
- (and (equal? (car stream1) (car stream2))
- (stream-equal? ((cdr stream1)) ((cdr stream2))))]
- [else #f]))
-
- (define (same-fringe? tree1 tree2)
- (stream-equal? (lazy-flatten tree1) (lazy-flatten tree2)))
-
- (define tree1 '(((1 . 2) . (3 . 4)) . (5 . 6)))
- (define tree2 '(1 . (((2 . 3) . (4 . 5)) . 6)))
-
- (same-fringe? tree1 tree2)
-
-