# How to sort a m x n matrix which has all its m rows sorted and n columns sorted?

Given a matrix with m rows and n columns, each of which are sorted. How to efficiently sort the entire matrix?

I know a solution which runs in O(m n log(min(m,n)). I am looking for a better solution.

The approach that I know basically takes 2 rows/cols at a time and applies merge operation.

Here is an example:

``````[[1,4,7,10],

[2,5,8,11],

[3,6,9,12]]
``````

is the input martix which has every row and column sorted.

Expected output is:

``````[1,2,3,4,5,6,7,8,9,10,11,12]
``````

Another example:

``````[[1, 2, 3, 3, 4, 5, 6, 6, 7, 7],

[1, 2, 4, 6, 7, 7, 8, 8, 9,10],

[3, 3, 4, 8, 8, 9,10,11,11,12],

[3, 3, 5, 8, 8, 9,12,12,13,14]]
``````
• Is the highest value for a cell in the matrix known? Is memory complexity an issue? – Neowizard Nov 25 '10 at 17:29
• The question is rather ambiguous - try giving a before/after example for a small m x n matrix. – Paul R Nov 25 '10 at 17:30
• think he just wants to sort the values in the matrix. (i.e. given that particular structure of values, what is an efficient way to sort the values) – lijie Nov 25 '10 at 17:32
• @Paul `[(1, 4, 8), (2, 9, 11), (3, 12, 14)]` – khachik Nov 25 '10 at 17:40
• Just added an example with the main question. – Anil Katti Nov 25 '10 at 17:43

I don't think you can do it any faster than Ω(m n log(min(m, n)), at least not in the general case.

Suppose (without loss of generality) that m < n. Then your matrix looks like this:

Each circle is a matrix entry and each arrow indicates a known order relation (the entry at the source of the arrow is smaller than the entry at the destination of the arrow).

To sort the matrix, we must resolve all the unknown order relations, some of which are shown in the grey boxes here:

Sorting all of these boxes takes:

2 Σk < m Ω(k log k) + (n - m + 1) Ω(m log m)

= 2 Ω(m² log m) + (n - m + 1) Ω(m log m)

= Ω(m n log m)

• +1 For the best presented answer I've seen to any question. Also looks correct to me, but that paled in to insignificance. – Orbling Nov 25 '10 at 19:06
• Wow! Thanks for the explanation. It looks sound. I did not understand a couple of thing: 1. Where did the second term, (n - m + 1) Ω(m log m) comes from? And, 2. I am wondering if there is a tighter upper bound for Σk < m Ω(k log k). Something tighter than Ω(m² log m)? – Anil Katti Nov 25 '10 at 19:47
• The (nm + 1) Ω(m log m) comes from the diagonal grey boxes that span the matrix from bottom to top: each such box contains m elements, and there are (nm + 1) of them. As for your other question, Ω is a lower bound, not an upper bound. – Gareth Rees Nov 25 '10 at 19:52
• This answer is wrong. Look at 7 and 6 in the first matrix. – hugomg Feb 15 '11 at 14:29
• Good spot. I added "some of" to make it clear that the grey boxes don't exhaust the unknown order relations. – Gareth Rees Feb 16 '11 at 14:42

If elements are integers within a certain range k where K=o(mn), we can use count sort with extra space to achieve O(mn), otherwise the mnlog(min(m,n)) is the best we can do.

By creating a Binary Search Tree, we can achieve this in O(mn) time. Take the last element from the first column (element 3 in the example mentioned above), make it as a root. Right nodes will be the n greater elements of that last row and left node will be the one above element ie. the (m-1)th or the 1st element from the second last row. Similarly for this element, the right nodes will be the n elements of that row. Again m-2 will be the left element and all the n elements in it's row will be the right elements. Similarly moving forward we'll have a binary search tree created in O(mn) time. This is O(mn) because we are not searching while inserting, it's a simple insert while traversing by shifting the root node pointer. Then inorder traversal of this BST will be done which will also be O(mn) time.

• The procedure you describe guarantees left nodes will be no larger and right nodes will be no smaller than their parent. It does not necessarily build a BST - consider the second example (first element of second column smaller last of first = root) or similarly a₁₁=1, a₁₂=2, a₂₁=3, a₂₂=4 . – greybeard Jan 1 '17 at 12:31