Description
At the entrance to the university, there is a huge rectangular billboard of size h*w (h is its height and w is its width). The board is the place where all possible announcements are posted: nearest programming competitions, changes in the dining room menu, and other important information.
On September 1, the billboard was empty. One by one, the announcements started being put on the billboard.
Each announcement is a stripe of paper of unit height. More specifically, the i-th announcement is a rectangle of size 1 * wi.
When someone puts a new announcement on the billboard, she would always choose the topmost possible position for the announcement. Among all possible topmost positions she would always choose the leftmost one.
If there is no valid location for a new announcement, it is not put on the billboard (that's why some programming contests have no participants from this university).
Given the sizes of the billboard and the announcements, your task is to find the numbers of rows in which the announcements are placed.
On September 1, the billboard was empty. One by one, the announcements started being put on the billboard.
Each announcement is a stripe of paper of unit height. More specifically, the i-th announcement is a rectangle of size 1 * wi.
When someone puts a new announcement on the billboard, she would always choose the topmost possible position for the announcement. Among all possible topmost positions she would always choose the leftmost one.
If there is no valid location for a new announcement, it is not put on the billboard (that's why some programming contests have no participants from this university).
Given the sizes of the billboard and the announcements, your task is to find the numbers of rows in which the announcements are placed.
Input
There are multiple cases (no more than 40 cases).
The first line of the input file contains three integer numbers, h, w, and n (1 <= h,w <= 10^9; 1 <= n <= 200,000) - the dimensions of the billboard and the number of announcements.
Each of the next n lines contains an integer number wi (1 <= wi <= 10^9) - the width of i-th announcement.
The first line of the input file contains three integer numbers, h, w, and n (1 <= h,w <= 10^9; 1 <= n <= 200,000) - the dimensions of the billboard and the number of announcements.
Each of the next n lines contains an integer number wi (1 <= wi <= 10^9) - the width of i-th announcement.
Output
For each announcement (in the order they are given in the input file)
output one number - the number of the row in which this announcement is
placed. Rows are numbered from 1 to h, starting with the top row. If an
announcement can't be put on the billboard, output "-1" for this
announcement.
Sample Input
3
5
5
2
4
3
3
Sample Output
1
2
1
3
-1
这个题乍一看10^9次方确实很吓人,但是n最多只有200,000,这样的话,即使每个广告牌占一行,也就前200,000行会被占用, 后面全部打酱油的。
再者,广告牌需要插在能放下它的最前面一行,自然插完这个广告牌,这行的容量就减少了。
最后,看这需要O(nlogn)才能过的,logn查询,总感觉像线段树。
然后稍微一想,就是一个线段树对区间最大值的维护。
起始每个点的值都是w,也就是每段区间的值都是w。
然后根据线段树查询,从左儿子到右儿子查询。
直到查到点对应的区间时,就修改该区间的val值,并返回lt或者rt值。
然而,这题数据规模有点BT,必须任意时候不满足就return -1,不能查到底部才返回。
然后根据线段树查询,从左儿子到右儿子查询。
直到查到点对应的区间时,就修改该区间的val值,并返回lt或者rt值。
然而,这题数据规模有点BT,必须任意时候不满足就return -1,不能查到底部才返回。
代码:
#include <iostream> #include <cstdio> #include <cstdlib> #include <cstring> #include <cmath> #include <set> #include <map> #include <queue> #include <string> #include <algorithm> #define LL long long using namespace std; int h, w, n; //线段树 //区间某点增值,求区间最大值 const int maxn = 200005; struct node { int lt, rt; int val; }tree[4*maxn]; //向上更新 void pushUp(int id) { tree[id].val = max(tree[id<<1].val, tree[id<<1|1].val); } //建立线段树 void build(int lt, int rt, int id) { tree[id].lt = lt; tree[id].rt = rt; tree[id].val = 0;//每段的初值,根据题目要求 if (lt == rt) { tree[id].val = w; return; } int mid = (lt + rt) >> 1; build(lt, mid, id<<1); build(mid + 1, rt, id<<1|1); pushUp(id); } //查询某段区间内的符合p的 int query(int lt, int rt, int id, int p) { if (tree[id].val < p) return -1; if (tree[id].lt == tree[id].rt) { tree[id].val -= p; return tree[id].lt; } int tmp; tmp = query(lt, rt, id<<1, p); if (tmp != -1) { pushUp(id); return tmp; } tmp = query(lt, rt, id<<1|1, p); pushUp(id); return tmp; } void work() { int k, ans; int len = min(h, n); build(1, len, 1); for (int i = 0; i < n; ++i) { scanf("%d", &k); ans = query(1, len, 1, k); printf("%d ", ans); } } int main() { //freopen("test.in", "r", stdin); while (scanf("%d%d%d", &h, &w, &n) != EOF) { work(); } return 0; }