#P1106E. Lunar New Year and Red Envelopes
Lunar New Year and Red Envelopes
No submission language available for this problem.
Description
Lunar New Year is approaching, and Bob is going to receive some red envelopes with countless money! But collecting money from red envelopes is a time-consuming process itself.
Let's describe this problem in a mathematical way. Consider a timeline from time $1$ to $n$. The $i$-th red envelope will be available from time $s_i$ to $t_i$, inclusive, and contain $w_i$ coins. If Bob chooses to collect the coins in the $i$-th red envelope, he can do it only in an integer point of time between $s_i$ and $t_i$, inclusive, and he can't collect any more envelopes until time $d_i$ (inclusive) after that. Here $s_i \leq t_i \leq d_i$ holds.
Bob is a greedy man, he collects coins greedily — whenever he can collect coins at some integer time $x$, he collects the available red envelope with the maximum number of coins. If there are multiple envelopes with the same maximum number of coins, Bob would choose the one whose parameter $d$ is the largest. If there are still multiple choices, Bob will choose one from them randomly.
However, Alice — his daughter — doesn't want her father to get too many coins. She could disturb Bob at no more than $m$ integer time moments. If Alice decides to disturb Bob at time $x$, he could not do anything at time $x$ and resumes his usual strategy at the time $x + 1$ (inclusive), which may lead to missing some red envelopes.
Calculate the minimum number of coins Bob would get if Alice disturbs him optimally.
The first line contains three non-negative integers $n$, $m$ and $k$ ($1 \leq n \leq 10^5$, $0 \leq m \leq 200$, $1 \leq k \leq 10^5$), denoting the length of the timeline, the number of times Alice can disturb Bob and the total number of red envelopes, respectively.
The following $k$ lines describe those $k$ red envelopes. The $i$-th line contains four positive integers $s_i$, $t_i$, $d_i$ and $w_i$ ($1 \leq s_i \leq t_i \leq d_i \leq n$, $1 \leq w_i \leq 10^9$) — the time segment when the $i$-th envelope is available, the time moment Bob can continue collecting after collecting the $i$-th envelope, and the number of coins in this envelope, respectively.
Output one integer — the minimum number of coins Bob would get if Alice disturbs him optimally.
Input
The first line contains three non-negative integers $n$, $m$ and $k$ ($1 \leq n \leq 10^5$, $0 \leq m \leq 200$, $1 \leq k \leq 10^5$), denoting the length of the timeline, the number of times Alice can disturb Bob and the total number of red envelopes, respectively.
The following $k$ lines describe those $k$ red envelopes. The $i$-th line contains four positive integers $s_i$, $t_i$, $d_i$ and $w_i$ ($1 \leq s_i \leq t_i \leq d_i \leq n$, $1 \leq w_i \leq 10^9$) — the time segment when the $i$-th envelope is available, the time moment Bob can continue collecting after collecting the $i$-th envelope, and the number of coins in this envelope, respectively.
Output
Output one integer — the minimum number of coins Bob would get if Alice disturbs him optimally.
Samples
5 0 2
1 3 4 5
2 5 5 8
13
10 1 6
1 1 2 4
2 2 6 2
3 3 3 3
4 4 4 5
5 5 5 7
6 6 6 9
2
12 2 6
1 5 5 4
4 6 6 2
3 8 8 3
2 9 9 5
6 10 10 7
8 12 12 9
11
Note
In the first sample, Alice has no chance to disturb Bob. Therefore Bob will collect the coins in the red envelopes at time $1$ and $5$, collecting $13$ coins in total.
In the second sample, Alice should disturb Bob at time $1$. Therefore Bob skips the first envelope, collects the second one and can not do anything after that. So the answer is $2$.