# Is “house coloring with three colors” NP?

Consider the problem described here (reproduced below.) Can some better known NP-complete problem be reduced to it?

The problem:

There are a row of houses. Each house can be painted with three colors: red, blue and green. The cost of painting each house with a certain color is different. You have to paint all the houses such that no two adjacent houses have the same color. You have to paint the houses with minimum cost. How would you do it?

Note: The cost of painting house 1 red is different from that of painting house 2 red. Each combination of house and color has its own cost.

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Where's the code? –  Sudhanshu Mar 26 '13 at 6:31
@Sudhanshu: In my answer :-) –  Knoothe Mar 26 '13 at 7:42

No, it is not NP-hard (technically, "NP-complete" is the wrong term for this, as this is not a decision problem).

Dynamic programming works, and gives you an O(n) time algorithm. (n is the number of houses).

You maintain three arrays R[1..n], B[1..n], G[1..n].

Where R[i] is the minimum cost of painting houses 1,2,3...,i such that i is colored Red.

Similary B is min cost of painting 1,2,...,i with i being colored Blue, and G is with i being colored Green.

You can compute R[i+1] = (Cost of painting house i+1 Red) + minimum {G[i], B[i]}.

Similarly B[i+1] and G[i+1] can be computed.

Ultimately you take the minimum of R[n], B[n] and G[n].

This is O(n) time and O(n) space.

Quick Python:

``````# rc = costs of painting red, bc of blue and gc of green.
def min_paint(rc, bc, gc):
n,i = len(rc),1
r,b,g = [0]*n,[0]*n,[0]*n
r[0],b[0],g[0] = rc[0],bc[0],gc[0]
while i < n:
r[i] = rc[i] + min(b[i-1], g[i-1])
b[i] = bc[i] + min(r[i-1], g[i-1])
g[i] = gc[i] + min(b[i-1], r[i-1])
i += 1

return r,b,g

def main():
print min_paint([1,4,6],[2,100,2],[3,100,4])

if __name__ == "__main__":
main()
``````
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It prints ([1, 6, 107], [2, 101, 8], [3, 101, 10]). What does that specify? –  user1247412 May 14 '13 at 18:57
Of course, more generally this solution is not so much O(n) as it is O(n*c). But with only 3 colors specificied, that's O(n). Either way, not an NP-hard problem. –  RichardPlunkett Nov 22 '13 at 10:17