# Merge skylines, divide and conquer

I'm trying to solve the famous skyline problem (see gif):

Input

(1,11,5), (2,6,7), (3,13,9), (12,7,16), (14,3,25), (19,18,22), (23,13,29), (24,4,28)

Should return, the points that are behind other buildings should be gone and the coordinates of changes in the Y-axis should be in the returning skyline:

(1, 11), (3, 13), (9, 0), (12, 7), (16, 3), (19, 18), (22, 3), (23, 13), (29, 0)

I'm trying to do so by using a divide and conquer approach to the algorithm as to achieve a running time of O(n lg n), but I'm stuck on the merge part.

Everytime I think about it I get confused. For example, I check which one the skylines is first e.g. which has the lower x-coordinate, then I add that + its hight to my new skyline. But then I encounter a skyline thats behind two other skylines, how can I detect this 'collision'?

Do I first check if the skylines have any overlap by checking if left.x2 < right.x1? But then I think what should I check first? Overlap of precedence on the x-axis and everything turns into a big chicken-egg mess.

Maybe I'm thinking too complicated? What I need is the set of highest y coordinates, at every intersection, should I approach it like this?

-

I think this should be an approach that's easier to wrap one's head around:

• Split x-coordinates into start and finish objects for each rectangle, as follows:

``````rect(x1, y, x2) -> (x1, y, "start", reference to rect),
(x2, y, "finish", reference to rect)
``````

So something like:

``````class MyStruct
{
Rectangle rect;
int x, y;
bool isStart;
}
``````
• Sort these objects by x-coordinate (`O(n log n)`)
• Create an (intially empty) set of rectangles (which will be sorted by y-coordinate, e.g. a BST)
• Loop through these objects (in the now-sorted order) (`O(n)`)
• Whenever a start is encountered
• Add the rectangle to the set of rectangles (`O(log n)`)
• If it's the new highest rectangle, add that start point to the output (`O(1)`)
• Whenever a finish is encountered
• Remove the rectangle from the set of rectangles (`O(log n)`)
• If it's the highest rectangle, find the next highest rectangle in the set and add the point `(current.finishX, new.y)` to the output (`O(1)`) (if the set is empty, add `(current.finishX, 0)` to the output instead)

So `O(n log n)`.

-
Let me see If I understand correctly, by splitting the x-coordinates you mean, for example, (2, 4, 8) -> (2, 4), (8, 0), right? –  Oxymoron Feb 20 '13 at 11:26
Sorry, I'm not clear on what you mean by 'current rectangles'. Just a list of the initial rectangles? –  Oxymoron Feb 20 '13 at 12:16
I'm sorry, maybe I'm just too stupid for this, but I still don't understand. Whenever a start is encountered: add it to the set of rectangles, but we just established that these structs aren't rectangles –  Oxymoron Feb 20 '13 at 13:05
@Oxymoron You add the rectangle member of the object to the set. –  Dukeling Feb 20 '13 at 13:22
I think there's a flaw though, between some buildings there is a gap and I think this fails to incorporate that. The gap (9,0) isn't reflected in the endresult I think.. Also, some buildings apper more than once as a building can be partly blocked from view –  Oxymoron Feb 20 '13 at 14:49