cf 923B Producing Snow

一 原题 C. Producing Snow

time limit per test 1 second memory limit per test 256 megabytes input standard input output standard output

Alice likes snow a lot! Unfortunately, this year's winter is already over, and she can't expect to have any more of it. Bob has thus bought her a gift — a large snow maker. He plans to make some amount of snow every day. On day i he will make a pile of snow of volume Vi and put it in her garden.

Each day, every pile will shrink a little due to melting. More precisely, when the temperature on a given day is Ti, each pile will reduce its volume by Ti. If this would reduce the volume of a pile to or below zero, it disappears forever. All snow piles are independent of each other.

Note that the pile made on day i already loses part of its volume on the same day. In an extreme case, this may mean that there are no piles left at the end of a particular day.

You are given the initial pile sizes and the temperature on each day. Determine the total volume of snow melted on each day.

Input

The first line contains a single integer N (1 ≤ N ≤ 105) — the number of days.

The second line contains N integers V1, V2, ..., VN (0 ≤ Vi ≤ 109), where Vi is the initial size of a snow pile made on the day i.

The third line contains N integers T1, T2, ..., TN (0 ≤ Ti ≤ 109), where Ti is the temperature on the day i.

Output

Output a single line with N integers, where the i-th integer represents the total volume of snow melted on day i.

Examples input Copy
3
10 10 5
5 7 2
output
5 12 4
input Copy
5
30 25 20 15 10
9 10 12 4 13
output
9 20 35 11 25
Note

In the first sample, Bob first makes a snow pile of volume 10, which melts to the size of 5 on the same day. On the second day, he makes another pile of size 10. Since it is a bit warmer than the day before, the first pile disappears completely while the second pile shrinks to 3. At the end of the second day, he has only a single pile of size 3. On the third day he makes a smaller pile than usual, but as the temperature dropped too, both piles survive till the end of the day.

二 分析

题意:每天给你体积为V(i)的一堆雪,每天所有的雪堆会融化T(i)(体积不会为负)。求1-N天内每天融化的雪的体积。1=N=1e5,0=V(i), T(i) = 1e9

思路:暴力的做法是O(n^2)的。一个更好的做法是:维护T的前缀和Pre,Pre(i)=T(1)+T(2)+...+T(i-1)。对于第i天新增的雪堆,不妨假设它第一天就存在,那么它的初始体积为V'(i)=V(i)+Pre(i-1),在第k天(k=i)如果V'(i)=Pre(k),那么这堆雪融化完,在第k天它融化的体积为V'(i)-Pre(k-1),否则就是T(k)。用一个multiset维护目前所有的V',总复杂度O(n*lgn)。

三 代码

#include cstdio
#include set

#define LL long long

using std::multiset;

const int maxn = 1e5 + 10;

int n, v[maxn], t[maxn];
LL ans = 0, pre[maxn];
multisetLL s;

int main() {
    scanf("%d", n);
    for (int i = 1; i = n; i++) scanf("%d", v[i]);
    for (int i = 1; i = n; i++) scanf("%d", t[i]);
    for (int i = 1; i = n; i++) {
        ans = 0;
        s.insert(v[i] + pre[i - 1]);
        pre[i] = pre[i - 1] + t[i];
        while (!s.empty()  *s.begin() = pre[i]) {
            ans += *s.begin() - pre[i - 1];
            s.erase(s.begin());
        }
        ans += s.size() * t[i];
        printf("%lld ", ans);
    }
    return 0;
}


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