http://bailian.openjudge.cn/practice/1821
- 总时间限制:
- 1000ms
- 内存限制:
- 65536kB

- 描述
- A team of k (1 <= K <= 100) workers should paint a fence which contains N (1 <= N <= 16 000) planks numbered from 1 to N from left to right. Each worker i (1 <= i <= K) should sit in front of the plank Si and he may paint only a compact interval (this means that the planks from the interval should be consecutive). This interval should contain the Si plank. Also a worker should not paint more than Li planks and for each painted plank he should receive Pi $ (1 <= Pi <= 10 000). A plank should be painted by no more than one worker. All the numbers Si should be distinct.

Being the team's leader you want to determine for each worker the interval that he should paint, knowing that the total income should be maximal. The total income represents the sum of the workers personal income.

Write a program that determines the total maximal income obtained by the K workers.

- 输入
- The input contains:

**Input**

N K

L1 P1 S1

L2 P2 S2

...

LK PK SK

**Semnification**

N -the number of the planks; K ? the number of the workers

Li -the maximal number of planks that can be painted by worker i

Pi -the sum received by worker i for a painted plank

Si -the plank in front of which sits the worker i

- 输出
- The output contains a single integer, the total maximal income.
- 样例输入
8 4
3 2 2
3 2 3
3 3 5
1 1 7

- 样例输出
17

- 提示
- Explanation of the sample:

the worker 1 paints the interval [1, 2];

the worker 2 paints the interval [3, 4];

the worker 3 paints the interval [5, 7];

the worker 4 does not paint any plank

- 来源
- Romania OI 2002