What's a good algorithm for Defense of a Kingdom?

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I was trying to Solve the Defense of a Kingdom problem and came up with an algorithm but it exceeds the time limit of the problem.

I want to know a good algorithm to solve this within the time limit. Any help is greatly appreciated, thanks in advance.

The problem:

Theodore implements a new strategy game “Defense of a Kingdom”. On each level a player defends the Kingdom that is represented by a rectangular grid of cells. The player builds crossbow towers in some cells of the grid. The tower defends all the cells in the same row and the same column. No two towers share a row or a column.

The penalty of the position is the number of cells in the largest undefended rectangle. For example, the position shown on the picture has penalty 12.

Help Theodore write a program that calculates the penalty of the given position.

Input

The first line of the input file contains the number of test cases.

Each test case consists of a line with three integer numbers: w — width of the grid, h — height of the grid and n — number of crossbow towers (1 ≤ w, h ≤ 40 000; 0 ≤ n ≤ min(w, h)).

Each of the following n lines contains two integer numbers xi and yi — the coordinates of the cell occupied by a tower (1 ≤ xi ≤ w; 1 ≤ yi ≤ h).

Output

For each test case, output a single integer number — the number of cells in the largest rectangle that is not defended by the towers.

Example

Input:
1
15 8 3
3 8
11 2
8 6

Output: 12

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What was your algorithm? – Oli Charlesworth Feb 18 '11 at 8:38
@Oli Charlesworth BruteForce :D – Ahmed Sherif Feb 18 '11 at 8:46
This might sound stupid but the goal is to output the biggest zone in white ? you don't have to find the place of the towers(since they are given as parameters)? – Jason Rogers Feb 18 '11 at 9:01

I would do it like this:

Given `w`, `h` as width and height of the playing field, and the coordinates of the towers as `(x1,y1) .. (xN,yN)`, split the coordinates into two lists `x1..xN`, `y1..yN`, sort both of those coordinate lists.

Then calculate the empty spaces, e.g. `dx[] = { x1, x2-x1, ..., xN - xN-1, (w + 1) - xN }`. Do the same for the y coordinates: `dy[] = { y1, y2-y1, ..., yN - yN-1, (h + 1) - yN }`. Multiply `max(dx)-1` by `max(dy)-1` and you should have the largest uncovered rectangle. You have to decrement the delta values by one because the line covered by the higher coordinate tower is included in it, but it is not uncovered.

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And the most computationally hard part of the problem would be... sorting! `O(n·log(n))`. Good solution, I was thinking of the same algorithm. – ulidtko Feb 18 '11 at 9:00
The largest rectangle doesn't have to have the largest dx and dy. The largest rectangle may be very thin and long. What if there is a 12x1 rectangle and a 3x3 rectangle uncovered? Your algorithm would then give 36 as the answer, not 12. Correct? – Gerco Dries Feb 18 '11 at 9:05
hmmm wouldn't work. the max(dx) and the max(dy) are not necessarily combined. you could have a zone 5x1, a zone 1x5 and and zone 4x4.... – Jason Rogers Feb 18 '11 at 9:06
@Gerco if there is a 12x1 area and a area 3x3 somewhere, on the "intersection" of the bigger coordinates there will be a 12x3 area. – Timbo Feb 18 '11 at 9:20
@Jason if there is a 5x1 area and a area 4x4 somewhere, on the "intersection" of the bigger coordinates there will be a 5x4 area. – Timbo Feb 18 '11 at 9:23

It is easy to see that the set of undefended cells is cartesian product of undefended “holes” in level's walls. So, at first, you don't need to store the whole field in memory — storing just two sequences of towers' coordinates will be enough.

The second observation would be that in final field, with all the towers set up, the largest undefended rectangle is equal to cartesian product of two most wide wall holes. Hence its area is equal to product of the holes' lengths. So what we really need to do is to find two most wide wall holes (one on `x` axis, one on `y`), and multiply their lengths. That would be the answer.

The final note is about input. The towers will probably be shuffled in some way around; but we need a way to derive all holes' lengths. This can easily be done by first sorting the coordinate sequences, separately one and the other, and then calculating {xi+1−xi} and {yi+1−yi} in a single pass. In the same pass we can even find the maximums — multiply them, and you are done.

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Ok this could be another first idea,

for each defender there is at least 1 and maximum 4 neighbor white area.

1. let `a:=0`
2. for each defender, start from greatest adjacent white area. move from there to an adjacent uncovered space with greater area, that you didn't move there before. do this until there is no possible move.
3. if there is no possible move and current area is greater than `a` store current area in `a`.
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 This won't work. Consider a counterexample: `[ ][   ][ ][ ][         ]`. If you start near the first area, you will get stuck in local extremum at the second area, and never reach the global maximum. – ulidtko Feb 19 '11 at 13:16 `for each` defender. we will search greatest area. this will work. – soroush Feb 21 '11 at 11:41

If you have a 9x6 grid. You have 3 towers.

First calculate the smallest gap for the x axis which has 9 elements. We have 3 towers. 9/3 = 3. So we place one tower per 3 elements.

``````[ ]
[ ]
[x]
[ ]
[ ]
[x]
[ ]
[ ]
[x]
``````

This is a 2 gap max. We can work this about by diving remaining spaces (6) by number of towers (3). 6/3 = 2.

Now to the same for y axis. 6 squares. 3 towers. 6/3 = one tower per 2 squares:

``````[ ][x][ ][x][ ][x]
``````

1 space max gap (3/3).

You now have the x and y coordinate of each tower (0 indexed):

``````1,2
3,5
5,8
``````

The biggest gap is 2x1 = 2.

``````[ ][ ][ ][ ][ ][ ]
[ ][ ][ ][ ][ ][ ]
[ ][x][ ][ ][ ][ ]
[ ][ ][ ][ ][ ][ ]
[ ][ ][ ][ ][ ][ ]
[ ][ ][ ][x][ ][ ]
[ ][ ][ ][ ][ ][ ]
[ ][ ][ ][ ][ ][ ]
[ ][ ][ ][ ][ ][x]
``````

I'm 99% sure you can create a general formula for this without the need for loops that returns the x,y pairs of each castle and the biggest penalty area.

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