转载注明出处 http://www.cnblogs.com/ligun123/archive/2013/03/19/2969477.html
题目来源:https://www.hackerrank.com/challenges/billboards
Billboards
ADZEN is a very popular advertising firm in your city. In every road you can see their advertising billboards. Recently they are facing a serious challenge , MG Road the most used and beautiful road in your city has been almost filled by the billboards and this is having a negative effect on the natural view.
On people’s demand ADZEN has decided to remove some of the billboards in such a way that there are no more than K billboards standing together in any part of the road.
You may assume the MG Road to be a straight line with N billboards.Initially there is no gap between any two adjecent billboards.
ADZEN’s primary income comes from these billboards so the billboard removing process has to be done in such a way that the billboards remaining at end should give maximum possible profit among all possible final configurations.Total profit of a configuration is the sum of the profit values of all billboards present in that configuration.
Given N,K and the profit value of each of the N billboards, output the maximum profit that can be obtained from the remaining billboards under the conditions given.
Input description
Ist line contain two space seperated integers N and K. Then follow N lines describing the profit value of each billboard i.e ith line contains the profit value of ith billboard.
Sample Input
6 2
1
2
3
1
6
10
Sample Output
21
Explanation
In given input there are 6 billboards and after the process no more than 2 should be together.
So remove 1st and 4th billboards giving a configuration _ 2 3 _ 6 10 having a profit of 21. No other configuration has a profit more than 21.So the answer is 21.
Constraints
1 <= N <= 1,00,000(10^5)
1 <= K <= N
0 <= profit value of any billboard <= 2,000,000,000(2*10^9)
待续~~参考背包问题求解