Given an n×n matrix of real numbers. You are allowed to erase any number (from 0 to n) of rows and any number (from 0 to n) of columns, and after that the sum of the remaining entries is computed. Come up with an algorithm which finds out which rows and columns to erase in order to maximize that sum.

The problem is NPhard. (So you should not expect a polynomialtime algorithm for solving this problem. There could still be (nonpolynomial time) algorithms that are slightly better than bruteforce, though.) The idea behind the proof of NPhardness is that if we could solve this problem, then we could solve the the clique problem in a general graph. (The maximumclique problem is to find the largest set of pairwise connected vertices in a graph.) Specifically, given any graph with n vertices, let's form the matrix A with entries
Now suppose we solve the problem of removing some rows and columns (or equivalently, keeping some rows and columns) so that the sum of the entries in the matrix is maximized. Then the answer gives the maximum clique in the graph:
All of which means that if the graph has a maximum clique of size 


Well the brute force method goes something like this:
0 elements is a valid subset but obviously if you have 0 rows or 0 columns the total is 0 so there are really 2^{2n2}+1 subsets but that's no different. So you can work out each combination by brute force as an O(a^{n}) algorithm. Fast. :) It would be quicker to work out what the maximum possible value is and you do that by adding up all the positive numbers in the grid. If those numbers happen to form a valid submatrix (meaning you can create that set by removing rows and/or columns) then there's your answer. Implicit in this is that if none of the numbers are negative then the complete matrix is, by definition, the answer. Also, knowing what the highest possible maximum is possibly allows you to shortcut the brute force evaluation since if you get any combination equal to that maximum then that is your answer and you can stop checking. Also if all the numbers are nonpositive, the answer is the maximum value as you can reduce the matrix to a 1 x 1 matrix with that 1 value in it, by definition. Here's an idea: construct 2^{n}1 n x m matrices where 1 <= m <= n. Process them one after the other. For each n x m matrix you can calculate:
if (1) is below the currently calculate highest maximum sum then you can discard this n x m matrix. If (2) is true then you just need a simple comparison to the current highest maximum sum. This is generally referred to as a pruning technique. What's more you can start by saying that the highest number in the n x n matrix is the starting highest maximum sum since obviously it can be a 1 x 1 matrix. I'm sure you could tweak this into a (slightly more) efficient recursive treebased search algorithm with the above tests effectively allowing you to eliminate (hopefully many) unnecessary searches. 


This is an iterative variation improving on another answer. It operates in O(n²) time, but fails for some cases mentioned in other answers, which is the complexity limit for this problem (there are n² entries in the matrix, and to even find the minimum you have to examine each cell once). Edit: The following matrix has no negative rows or columns, but is also not maximized, and my algorithm doesn't catch it.
The following matrix does have negative rows and columns, but my algorithm selects the wrong ones for removal.



I cannot really produce an algorithm on top of my head, but to me it 'smells' like dynamic programming, if it serves as a start point. 


To try it in a simple way: We need the valid subset of the set of entries {A00, A01, A02, ..., A0n, A10, ...,Ann} which max. sum. First compute all subsets (the power set). A valid subset is a member of the power set that for each two contained entries Aij and A(i+x)(j+y), contains also the elements A(i+x)j and Ai(j+y) (which are the remaining corners of the rectangle spanned by Aij and A(i+x)(j+y)).
By that you can eliminate the invalid ones from the power set and find the one with the biggest sum in the remaining. I'm sure it can be improved by improving an algorithm for power set generation in order to generate only valid subsets and by that avoiding step 2 (adjusting the power set). 


Since nobody asked for an efficient algorithm, use brute force: generate every possible matrix that can be created by removing rows and/or columns from the original matrix, choose the best one. A slightly more efficent version, which most likely can be proved to still be correct, is to generate only those variants where the removed rows and columns contain at least one negative value. 


We can improve on Cletus's generalized bruteforce solution by modelling this as a directed graph. The initial matrix is the start node of the graph; its leaves are all the matrices missing one row or column, and so forth. It's a graph rather than a tree, because the node for the matrix without both the first column and row will have two parents  the nodes with just the first column or row missing. We can optimize our solution by turning the graph into a tree: There's never any point exploring a submatrix with a column or row deleted that comes before the one we deleted to get to the current node, as that submatrix will be arrived at anyway. This is still a bruteforce search, of course  but we've eliminated the duplicate cases where we remove the same rows in different orders. Here's an example implementation in Python:
And here's the output on 280Z28's example matrix:



I think there are some angles of attack that might improve upon brute force.



Big Edit: I honestly don't think there's a way to assess a matrix and determine it is maximized, unless it is completely positive. Maybe it needs to branch, and fathom all elimination paths. You never no when a costly elimination will enable a number of better eliminations later. We can short circuit if it's found the theoretical maximum, but other than any algorithm would have to be able to step forward and back. I've adapted my original solution to achieve this behaviour with recursion. Double Secret Edit: It would also make great strides to reduce to complexity if each iteration didn't need to find all negative elements. Considering that they don't change much between calls, it makes more sense to just pass their positions to the next iteration. Takes a matrix, the list of current negative elements in the matrix, and the theoretical maximum of the initial matrix. Returns the matrix's maximum sum and the list of moves required to get there. In my mind move list contains a list of moves denoting the row/column removed from the result of the previous operation. Ie: r1,r1 Would translate
I'm not sure if it's better or worse than the brute force method, but it handles all the test cases now. Even those where the maximum contains negative values. 


Take each row and each column and compute the sum. For a 2x2 matrix this will be:
Row(0) = 3 Row(1) = 7 Col(0) = 5 Col(1) = 9 Compose a new matrix
Take out whatever you need to, then start again. You just look for negative values on the new matrix. Those are values that actually substract from the overall matrix value. It terminates when there're no more negative "SUMS" values to take out (therefore all columns and rows SUM something to the final result) In an nxn matrix that would be O(n^2)Log(n) I think 


Compute the sum of each row and column. This can be done in O(m) (where m = n^2) While there are rows or columns that sum to negative remove the row or column that has the lowest sum that is less than zero. Then recompute the sum of each row/column. The general idea is that as long as there is a row or a column that sums to nevative, removing it will result in a greater overall value. You need to remove them one at a time and recompute because in removing that one row/column you are affecting the sums of the other rows/columns and they may or may not have negative sums any more. This will produce an optimally maximum result. Runtime is O(mn) or O(n^3) 


This is an optimization problem and can be solved approximately by an iterative algorithm based on simulated annealing: Notation: C is number of columns. For J iterations:
Iterate for J iterations until convergence. We may also, in early iterations, make each of these probability distributions more uniform, so that we don't get locked into bad decisions early on. So we'd raise the unnormalized probabilities to a power 1/T, where T is high in early iterations and is slowly decreased until it approaches 0. For example, 0.05, 0.73, 0.98 from above, raised to 1/10 results in 0.74, 0.97, 1.0, which after normalization is 0.27, 0.36, 0.37 (so it's much more uniform than the original 0.05, 0.73, 0.98). 


It's clearly NPComplete (as outlined above). Given this, if I had to propose the best algorithm I could for the problem:
Obviously this isn't guaranteed to find the maximal solution. But, it generally would when this is feasible, and it would provide a very good locally maximal solution otherwise. If someone had a practical situation requiring such optimisation, this is the solution that I'd think would work best. Stopping at identifying that a problem is likely to be NPComplete will not look good in a job interview! (Unless the job is in complexity theory, but even then I wouldn't.) You need to suggest good approaches  that is the point of a question like this. To see what you can come up with under pressure, because the real world often requires tackling such things. 





yes, it's NPcomplete problem. It's hard to easily find the best submatrix,but we can easily to find some better submatrix. Assume that we give m random points in the matrix as "feeds". then let them to automatically extend by the rules like : if add one new row or column to the feedmatrix, ensure that the sum will be incrementive. ,then we can compare m submatrix to find the best one. 

