# Need help identifying an integer sorting algorithm

What sorting algorithm is this? I thought of this method last night and quickly drew up some code, and to my surprise worked perfectly. I've been looking through the Wikipedia article on sorting algorithms and have searched Stack Overflow but have been unable to find this or similar algorithm.

This is the algorithm's written process:

``````[3, 1, 0, 4]
^        ^  Check outermost items, swap if necessary
----------------
[3, 1, 0, 4]
^     ^     Check first pair of second farthest apart items, swap if necessary
[0, 1, 3, 4]
----------------
[0, 1, 3, 4]
^     ^  Check second pair of second farthest apart items, swap if necessary
----------------
[0, 1, 3, 4]
^  ^        Check first pair of third farthest apart items, swap if necessary
----------------
[0, 1, 3, 4]
^  ^     Check second pair of third farthest apart items, swap if necessary
----------------
[0, 1, 3, 4]
^  ^  Check third pair of third farthest apart items, swap if necessary
----------------
[0, 1, 3, 4]
Cannot compare closer items (adjacent), done.
``````

This is the algorithm in JavaScript:

``````var unsorted = [4, 9, 10, 2, 9, 4, 0];
var sorted = ianSort(unsorted);

function ianSort(array) {
for(var j = array.length; j > 1; j--) {
for(var i = 0; i < array.length - j + 1; i++) {
if(array[i] > array[i + j - 1]) {
var temp = array[i];
array[i] = array[i + j - 1];
array[i + j - 1] = temp;
}
}
}
return array;
}
``````

(I've called the function IanSort here in the unlikely event that I'm the first person to think this up. ^_^)

-
@Ian- Are you sure this always works? That is, do you have a correctness proof to suggest that it will work correctly? Also as written I think that this is an O(n^2) sort, so unfortunately I don't think you'll become Rich and Famous from it. Still, it's really cool if it does work! :-) –  templatetypedef Feb 11 '11 at 2:25
No, it is not O(n^2), it is actually fairly effecient. And yes, I have tested my code thoroughly. –  Ian Feb 11 '11 at 2:31
it looks quadratic though. The number of operations is `1 + 2 + 3 + ... + array.length`, which adds up to `O(n^2)`. Have you tested it on an array with a million elements, for example? –  IVlad Feb 11 '11 at 2:40
yes, it is O(n^2). You have for loops nested two-deep over n. It's not only O(n^2), it's Theta(n^2). –  rlibby Feb 11 '11 at 2:43
Comb sorts are O(n log n), like the quick sort. –  oosterwal Feb 11 '11 at 4:20

I believe that what you've devised is related to comb sort, which is a generalization of bubble sort that initially starts with a large step size and then decays the step size over time. Traditionally, comb sort works by starting with a large size and then decaying the interval size by a constant factor on each iteration. Your algorithm essentially does this by choosing a constant such that the step size shrinks by one on each iteration.

-
Beat me by seconds... –  Blastfurnace Feb 11 '11 at 2:29
Could you care to show me how they are similar in a slightly more detailed way? Sorry, I'm having a hard time matching up the two algorithms. –  Ian Feb 11 '11 at 2:32
@Ian: It's an extension of bubble sort in the same sense that Shell sort is an extension of insertion sort. –  Blastfurnace Feb 11 '11 at 2:38
@Ian- In both comb sort and your sorting algorithm, the sort works by comparing elements at some distance and swapping them based on how they compare with one another. In your algorithm, this works by considering all possible spacings and all possible positions of those spacings. In comb sort, the spacing is initially chosen to be a large value, which is then decreased over time. The main different between your sort and comb sort is how the spacing decreases. Yours chooses all possible spacings, while comb sort decreases the spacing geometrically. –  templatetypedef Feb 11 '11 at 3:13

Looks like a Comb sort

-

I'm not quite sure, but it looks like the bubble sort algorithim to me.

-

This appears to be a form of the Comb Sort algorithm. I also thought I was the first to discover it several years ago and made up several variations to test against the quick sort and other sorting algorithms. You can read about my research here.

It's a fast algorithm that can compete with the quick sort, even beating it under some conditions.

-