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Say I have a tree defined as per the recommendation in this post, although it's a vector in my case, which hopefully shouldn't matter (they're vectors in Programming Clojure book):

(def tree [1 [[2 [4] [5]] [3 [6]]]])

which should be something like:

     / \
    2   3
   / \  |
  4   5 6

Now, I'd like to do a breadth-first traversal of the tree without any of the traditional means such as the queue, and instead use exclusively the stack to pass information around. I know this isn't the easiest route, but I'm doing it mostly as exercise. Also at this point I'm not planning to return a collection (I'll figure that out afterwards as exercise) but instead just print out the nodes as I travel through them.

My current solution (just starting out with Clojure, be nice):

(defn breadth-recur
  (if (empty? queue)
    (println "Done!")
    (let [collections (first (filter coll? queue))]
        ; print out nodes on the current level, they will not be wrapped'
        ; in a [] vector and thus coll? will return false
        (doseq [node queue] (if (not (coll? node)) (println node)))
        (recur (reduce conj (first collections) (rest collections)))))))

The last line is not working as intended and I'm stumped about how to fix it. I know exactly what I want: I need to peel each layer of vectors and then concatenate the results to pass into recur.

The issue I'm seeing is mostly a:

IllegalArgumentException Don't know how to create ISeq from: java.lang.Long 

Basically conj doesn't like appending a vector to a long, and if I swap conj for concat, then I fail when one of the two items I'm concatenating isn't a vector. Both conj and concat fail when facing:

[2 [4] [5] [3 [6]]]

I feel like I'm missing a really basic operation here that would work both on vectors and primitives in both positions.

Any suggestions?

Edit 1:

The tree should actually be (thanks Joost!):

(def tree [1 [2 [4] [5]] [3 [6]]])

However we still haven't found a breadth-first solution.

share|improve this question
Did you have a look at the source of the functions in clojure.walk or the function tree-seq? They implement tree traversal and might be interesting to you. – Gert Jul 10 '12 at 11:47
@Gert: It's my impression that all of those are depth-first, correct? I also considered zippers, but then my brain started melting at the thought. – Alexandr Kurilin Jul 10 '12 at 23:40
Ah yes, clojure.walk does depth-first traversal; I missed the breadth-first requirement in your post, oops! – Gert Jul 11 '12 at 1:01
up vote 15 down vote accepted

Since apparently there is still no breadth-first solution posted, here is a simple algorithm, implemented first eagerly, and then transformed to be lazy:

(defn bfs-eager [tree]
  (loop [ret [], queue (conj clojure.lang.PersistentQueue/EMPTY tree)]
    (if (seq queue)
      (let [[node & children] (peek queue)]
        (recur (conj ret node) (into (pop queue) children)))

(defn bfs-lazy [tree]
  ((fn step [queue]
      (when (seq queue)
        (let [[node & children] (peek queue)]
          (cons node
                (step (into (pop queue) children)))))))
   (conj clojure.lang.PersistentQueue/EMPTY tree)))
share|improve this answer
I'm curious, are you using a PersistentQueue simply because it's faster than a list? – Alexandr Kurilin Jul 11 '12 at 6:17
We need to take from the front and add to the end. We could use a lazy sequence with concat, but this will fail if the tree is very large. So in some sense: yes, we could have used a list here. But aside from being much, much slower, it also doesn't express the intent: this is a queue, so why not use an actual queue structure? – amalloy Jul 11 '12 at 7:26
So if I'm understanding correctly, both a vector and a list work as stacks (from different sides) if you use conj/pop, however with PersistentQueue you get to pop from the front and conj at the end? – Alexandr Kurilin Jul 11 '12 at 7:44
That's correct. – amalloy Jul 11 '12 at 8:21

many combinations of reduceand conj can be replaced with single into call in the case above with reduce you may need to pass an initial empty vector to reduce to get make conjunction happy.

share|improve this answer

Your tree data is incorrect. It should be [1 [2 [4] [5]] [3 [6]]]

Also, you're mixing the tree traversal with printing and building up a result. Things get simpler if you concentrate on doing the hard part separately:

(def tree [1 [2 [4] [5]] [3 [6]]])


(defn bf "return elements in tree, breath-first"
   [[el left right]] ;; a tree is a seq of one element,
                     ;; followed by left and right child trees
   (if el
     (concat [el] (bf left) (bf right))))

(bf tree)
=> (1 2 4 5 3 6)


(defn bf [& roots] 
   (if (seq roots) 
       (concat (map first roots) ;; values in roots
               (apply bf (mapcat rest roots))))) ;; recursively for children

(bf tree)
=> (1 2 3 4 5 6)
share|improve this answer
That works, thanks! I forgot to mention that I was trying to solve the problem for the general case where there is no maximum number of children nodes, hence my attempt to reduce/into. Also, is there any way to do that with a tail call? – Alexandr Kurilin Jul 10 '12 at 9:12
(defn bf [[el & children]] (if el (apply concat [el] (map bf children)))) – Joost Diepenmaat Jul 10 '12 at 9:23
if you really want to you can transform that into a tail call. but I don't see the point since it's inherently stack-based and already lazy. – Joost Diepenmaat Jul 10 '12 at 9:23
Isn't that depth-first? – kotarak Jul 10 '12 at 11:58
@Joost Diepenmaat: I have the same question as kotarak... Isn't 1 2 4 5 3 6 DFS while a BFS should give 1 2 3 4 5 6? I mean, it looks like OP constructed his tree precisely so that a BFS give back 1 2 3 4 5 6. The Wikipedia article on BFS does the same with a 'a b c d e f g h'. See animated gif here: – TacticalCoder Jul 10 '12 at 17:30

This might help, I was creating an algorithm to evaluate if a tree is symmetric and used a breadth-first traversal:

(defn node-values [nodes]
    (map first nodes))

(defn node-children [nodes]
  (mapcat next nodes))

(defn depth-traversal [nodes]
    (if (not (empty? nodes))
        (cons (node-values nodes) (depth-traversal (node-children nodes)))))

(defn tree-symmetric? [tree]
        (fn [depth] (= depth (reverse depth)))
        (depth-traversal (list tree))))

(def tree '(1 (2 (3) (4)) (2 (4) (3))))
(node-values (list tree)) ; (1)
(node-children (list tree)) ; ((2 (3) (4)) (2 (4) (3)))
(depth-traversal (list tree)) ; ((1) (2 2) (3 4 4 3))
(tree-symmetric? tree) ; true
share|improve this answer

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