I just came across this little problem on UVA's Online Judge and thought, that it may be a good candidate for a little code-golf.

**The problem:**

You are to design a program to assist an architect in drawing the skyline of a city given the locations of the buildings in the city. To make the problem tractable, all buildings are rectangular in shape and they share a common bottom (the city they are built in is very flat). The city is also viewed as two-dimensional. A building is specified by an ordered triple **(Li, Hi, Ri)** where **Li** and **Ri** are left and right coordinates, respectively, of building i and **Hi** is the height of the building.

In the diagram below buildings are shown on the left with triples

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

and the skyline, shown on the right, is represented by the sequence:

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

The output should consist of the vector that describes the skyline as shown in the example above. In the skyline vector **(v1, v2, v3, ... vn)** , the **vi** such that i is an even number represent a horizontal line (height). The **vi** such that i is an odd number represent a vertical line (x-coordinate). The skyline vector should represent the "path" taken, for example, by a bug starting at the minimum x-coordinate and traveling horizontally and vertically over all the lines that define the skyline. Thus the last entry in the skyline vector will be a 0. The coordinates must be separated by a blank space.

If I will not count declaration of provided (test) buildings and including all spaces and tab characters, my solution, in Python, is **223** characters long.

Here is the condensed version:

```
B=[[1,11,5],[2,6,7],[3,13,9],[12,7,16],[14,3,25],[19,18,22],[23,13,29],[24,4,28]]
# Solution.
R=range
v=[0 for e in R(max([y[2] for y in B])+1)]
for b in B:
for x in R(b[0], b[2]):
if b[1]>v[x]:
v[x]=b[1]
p=1
k=0
for x in R(len(v)):
V=v[x]
if p and V==0:
continue
elif V!=k:
p=0
print "%s %s" % (str(x), str(V)),
k=V
```

I think that I didn't made any mistake but if so - feel free to criticize me.

I don't have much reputation, so I will pay only 100 for a bounty - I am curious, if anyone could try to solve this in less than .. lets say, 80 characters. Solution posted by **cobbal** is 101 characters long and currently it is the best one.

I thought, that 80 characters is a sick limit for this kind of problem. **cobbal**, with his 46 character solution totaly amazed me - though I must admit, that I spent some time reading his explanation before I partially understood what he had written.

( They do however match the image that it goes along with. )– Brad Gilbert Jul 8 '09 at 3:331more comment