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Im trying to build a kd-tree for searching through a set of points, but am getting confused about the use of 'median' in the wikipedia article. For ease of use, the wikipedia article states the pseudo-code of kd-tree construction as:

function kdtree (list of points pointList, int depth)
    if pointList is empty
        return nil;
        // Select axis based on depth so that axis cycles through all valid values
        var int axis := depth mod k;

        // Sort point list and choose median as pivot element
        select median by axis from pointList;

        // Create node and construct subtrees
        var tree_node node;
        node.location := median;
        node.leftChild := kdtree(points in pointList before median, depth+1);
        node.rightChild := kdtree(points in pointList after median, depth+1);
        return node;

I'm getting confused about the "select median..." line, simply because I'm not quite sure what is the 'right' way to apply a median here.

As far as I know, the median of an odd-sized (sorted) list of numbers is the middle element (aka, for a list of 5 things, element number 3, or index 2 in a standard zero-based array), and the median of an even-sized array is the sum of the two 'middle' elements divided by two (aka, for a list of 6 things, the median is the sum of elements 3 and 4 - or 2 and 3, if zero-indexed - divided by 2.).

However, surely that definition does not work here as we are working with a distinct set of points? How then does one choose the correct median for an even-sized list of numbers, especially for a length 2 list?

I appreciate any and all help, thanks!


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2 Answers 2

up vote 1 down vote accepted

It appears to me that you understand the meaning of median, but you are confused with something else. What do you mean be distinct set of points?

The code presented by Wikipedia is a recursive function. You have a set of points, so you create a root node and choose a median of the set. Then you call the function recursively - for the left subtree you pass in a parameter with all the points smaller than the split-value (the median) of the original list, for the right subtree you pass in the equal and larger ones. Then for each subtree a node is created where the same thing happens. It goes like this:

First step (root node):
Original set: 1 2 3 4 5 6 7 8 9 10
Split value (median): 5.5

Second step - left subtree:
Set: 1 2 3 4 5
Split value (median): 3

Second step - right subtree:
Set: 6 7 8 9 10
Split value (median): 8

Third step - left subtree of left subtree:
Set: 1 2
Split value (median): 1.5

Third step - right subtree of left subtree:
Set: 3 4 5
Split value (median): 4


So the median is chosen for each node in the tree based on the set of numbers (points, data) which go into that subtree. Hope this helps.

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I apologise if my meaning wasn't clear. What I meant by 'distinct' was that if I was trying to form a kd-tree with the points (1,1), (2,2), (3,3), (4,4), (5,5) and (6,6), the median would normally be (3.5, 3.5). However, (3.5,3.5) doesn't exist in the points I'm making a kd-tree out of, so what happens? From your example above, I assume you actually create a new node for the tree, the median node? – Stephen May 28 '10 at 8:02
You are confused in two ways. First, when looking for the median, you must pick one dimension! So the median in your example cannot be (3.5, 3.5), since that is a two dimensional point. Instead the first step is to pick the dimension (say you pick the first). Then you look just at the first dimension of all the points and calculate the median. How to pick the best dimension is another thing. Second thing: no, you dont create a new node. The median is just a value - not the part of the original data. Look at it as a attribute of the splitting node of the tree. – PeterK May 28 '10 at 8:09
Ah, right, okay. Then I'm afraid I am still confused, sorry =[. In the first step, the root node, you declare the median value to be 5.5. But which node becomes the root node then? Your left and right sub-trees contain all of the points, so which was chosen to be the root of these sub-trees? – Stephen May 28 '10 at 8:11
I just found a different page -… - which seems to imply that in a kd-tree, the nodes of the trees are not points that you want to classify; these are apparently stored in leaves. Is this correct, and I've been looking at kd-trees wrong this entire time? Wikipedia seemed to imply that the nodes are the points in the tree! – Stephen May 28 '10 at 8:15
Everything is a lot simpler if the nodes are at actual points and you define the median as the middle item in the list of points (sorted on the appropriate axis). The nodes in a kd-tree don't have to be points you want to classify, you certainly could insert "crossroad" points at the median if you wish, but that simply creates a tree with more nodes than necessary and will slow down your searching and also make finding exact points in the tree difficult as you have to ignore these "crossroad" nodes. – Tom Mar 10 '11 at 4:17

You have to choose an axis with as many element on one side than the other. If the number of points is odd or the points are positioned in such a way that it isn't possible, just choose an axis to give an as even repartition as possible.

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