200663: [AtCoder]ARC066 F - Contest with Drinks Hard

Memory Limit:256 MB Time Limit:2 S
Judge Style:Text Compare Creator:
Submit:0 Solved:0

Description

Score : $1400$ points

Problem Statement

Joisino is about to compete in the final round of a certain programming competition. In this contest, there are $N$ problems, numbered $1$ through $N$. Joisino knows that it takes her $T_i$ seconds to solve problem $i(1≦i≦N)$.

In this contest, a contestant will first select some number of problems to solve. Then, the contestant will solve the selected problems. After that, the score of the contestant will be calculated as follows:

  • (The score) $=$ (The number of the pairs of integers $L$ and $R$ $(1≦L≦R≦N)$ such that for every $i$ satisfying $L≦i≦R$, problem $i$ is solved) - (The total number of seconds it takes for the contestant to solve the selected problems)

Note that a contestant is allowed to choose to solve zero problems, in which case the score will be $0$.

Also, there are $M$ kinds of drinks offered to the contestants, numbered $1$ through $M$. If Joisino takes drink $i(1≦i≦M)$, her brain will be stimulated and the time it takes for her to solve problem $P_i$ will become $X_i$ seconds. Here, $X_i$ may be greater than the length of time originally required to solve problem $P_i$. Taking drink $i$ does not affect the time required to solve the other problems.

A contestant is allowed to take exactly one of the drinks before the start of the contest. For each drink, Joisino wants to know the maximum score that can be obtained in the contest if she takes that drink. Your task is to write a program to calculate it instead of her.

Constraints

  • All input values are integers.
  • $1≦N≦3*10^5$
  • $1≦T_i≦10^9$
  • (The sum of $T_i$) $≦10^{12}$
  • $1≦M≦3*10^5$
  • $1≦P_i≦N$
  • $1≦X_i≦10^9$

Input

The input is given from Standard Input in the following format:

$N$
$T_1$ $T_2$ $...$ $T_N$
$M$
$P_1$ $X_1$
$P_2$ $X_2$
$:$
$P_M$ $X_M$

Output

For each drink, print the maximum score that can be obtained if Joisino takes that drink, in order, one per line.


Sample Input 1

5
1 1 4 1 1
2
3 2
3 10

Sample Output 1

9
2

If she takes drink $1$, the maximum score can be obtained by solving all the problems.

If she takes drink $2$, the maximum score can be obtained by solving the problems $1,2,4$ and $5$.


Sample Input 2

12
1 2 1 3 4 1 2 1 12 3 12 12
10
9 3
11 1
5 35
6 15
12 1
1 9
4 3
10 2
5 1
7 6

Sample Output 2

34
35
5
11
35
17
25
26
28
21

Input

题意翻译

Joisino 要去打 final。这场比赛中,有 $N$ 道题,编号从 $1$ 到 $N$ 。Joisino 做第 $i$ 道题花费的时间为 $T_i$ 。 这场比赛中,选手的做题方式是选择自己想做的题来做,并且一定能做出来。最后,选手的得分将以如下方式计算: $$ 得分 = \text{满足条件的二元组 $(l, r)$ 的个数} - \text{解决选了的题所花费的时间} $$ 其中,二元组 $(l, r)$ 需要满足的条件是:对于所有满足 $l \le i \le r$ 的 $i$ ,第 $i$ 题都做了。另外, $l$ 和 $r$ 还需满足 $1 \le l \le r \le N$ 。 注意,选手可以选择对所有题弃疗,这样他将爆零。 主办方为参赛者提供了 $M$ 种饮料,从 $1$ 标号至 $M$ 。如果 Joisino 喝了第 $i$ 种饮料,他做第 $P_i$ 题时会兴奋,做第 $P_i$ 题的时间将从 $T_{P_i}$ 变成 $X_i$ ,注意 $X_i$ 不一定比 $T_{P_i}$ 小;做其它题的时间不受影响。 一位参赛者能且仅能带一种饮料进入考场。Joisino 想知道如果他喝下了每种饮料,他的最大得分。 感谢@OrangeLee 提供的翻译

加入题单

上一题 下一题 算法标签: