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How do i implement a Queue using a BST.

Is this the way to do it, keep on inserting the nodes in the tree while maintaining a count value associated with each and every node,but while deletion BST should work like queue(FIFO) so start deleting from BST with the node having lowest count value in the tree.

Did i get the question and solution right? If not,then please explain me the question.

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It's not entirely unusual to use a binary tree for a queue, but a binary search tree (one with nodes sorted by key) is going to be a bit weird -- the key will just duplicate the ordering information already present in the tree. –  Dietrich Epp Nov 18 '12 at 22:24
    
What are you trying to do that needs a Queue based on a BST? That's like hitting an archery target with a cannon, shall we say overkill. –  Thomas Matthews Nov 19 '12 at 2:09
    
I am not doing anything specific, i was curious to know about it –  Sumit Kumar Saha Nov 19 '12 at 11:08

2 Answers 2

up vote 1 down vote accepted

You can have a Queue like this:

BST // to store data
pointer to head; // Points to the head of the Queue
pointer to tail  // Points to the tail of the Queune

You add to the nodes structs of BST also a pointer to another node that will represent the order of insertion.

struct Node{
  int x;
  //left pointer
  //right pointer
  struct Node *next_queune_element;
}

During the insertion When you had a element you access to the node that the pointer tail points, and make it point to the new element that you just inserted (the BST node). Then you update the tail pointer to point to the new element.

During the deletion When you remove a element, you first will access the node that the head pointer points to, you store the next_queune_element in a auxiliary temporary variable, remove the node. And then, make the head pointer to point to the auxiliary temporary variable.

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This actually isn't using a BST. –  AJMansfield Nov 18 '12 at 21:31
    
? Why do you say that? –  dreamcrash Nov 18 '12 at 21:34
    
You are using a linked list, and just calling it a tree. –  AJMansfield Nov 18 '12 at 21:37
    
Nop, I am not. I just add a new pointer into each tree node. –  dreamcrash Nov 18 '12 at 21:38
    
All data except what is in the first node is not actually part of the BST, in your example. A real BST doesn't have a beginning node and an ending node. Or really, all of its leaf nodes are its end nodes, not any particular one. By adding the new pointer, you have made it not a BST. –  AJMansfield Nov 18 '12 at 21:41

A BST is really an inappropriate data structure to use to back a queue. You really ought to use a linked list instead, because it would be way faster, less complicated, and plain old better.

However, if you insist on using a BST...

You would use the BST as a priority queue, and define a wrapper type that also holds a 'queue index', which is what the items would be sorted by. You would have to define the comparison to take into account the current queue index though, because otherwise you could only ever add as many items as the difference between the highest and lowest values of your index type.

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Priority queue is implemeted using a max/min heap,then how a heap could be used as a BST or vice versa –  Sumit Kumar Saha Nov 18 '12 at 22:46
    
@SumitKumarSaha Really, I didn't know. I thought c++ prority queue was implemented the same way as java's PriorityQueue, using a red-black tree. Apparently I was mistaken. Thank you for clarifying. –  AJMansfield Nov 19 '12 at 12:10
    
Actually, it was Java's SortedSet or some such that uses Red-Black trees. PriorityQueue uses a heap. –  AJMansfield Sep 18 '13 at 0:56
    
So actually I can use BST - AVL to implement queue ? thanks. –  Ofir Attia Jan 25 at 20:18
1  
@OfirAttia No. Queues have only a few operations: add an item (add), remove first item (pop), and examine the first item (top). A BST will have abominable performance compared to a heap, node list, or ring buffer for those operations, and is absolutely not acceptable. BSTs are used if one needs fast membership testing (find) or fast insertion (insert), which queues do not need. –  AJMansfield Jan 25 at 20:50

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