Codeforces Round #496 (Div. 3 ) E1. Median on Segments (Permutations Edition)(中位数计数)

E1. Median on Segments (Permutations Edition)
time limit per test

3 seconds

memory limit per test

256 megabytes

input

standard input

output

standard output

You are given a permutation p1,p2,…,pnp1,p2,…,pn. A permutation of length nn is a sequence such that each integer between 11 and nn occurs exactly once in the sequence.

Find the number of pairs of indices (l,r)(l,r) (1≤l≤r≤n1≤l≤r≤n) such that the value of the median of pl,pl+1,…,prpl,pl+1,…,pr is exactly the given number mm.

The median of a sequence is the value of the element which is in the middle of the sequence after sorting it in non-decreasing order. If the length of the sequence is even, the left of two middle elements is used.

For example, if a=[4,2,7,5]a=[4,2,7,5] then its median is 44 since after sorting the sequence, it will look like [2,4,5,7][2,4,5,7] and the left of two middle elements is equal to 44. The median of [7,1,2,9,6][7,1,2,9,6] equals 66 since after sorting, the value 66 will be in the middle of the sequence.

Write a program to find the number of pairs of indices (l,r)(l,r) (1≤l≤r≤n1≤l≤r≤n) such that the value of the median of pl,pl+1,…,prpl,pl+1,…,pr is exactly the given number mm.

Input

The first line contains integers nn and mm (1≤n≤2⋅1051≤n≤2⋅105, 1≤m≤n1≤m≤n) — the length of the given sequence and the required value of the median.

The second line contains a permutation p1,p2,…,pnp1,p2,…,pn (1≤pi≤n1≤pi≤n). Each integer between 11 and nn occurs in pp exactly once.

Output

Print the required number.

Examples
input
Copy
5 4
2 4 5 3 1
output
Copy
4
input
Copy
5 5
1 2 3 4 5
output
Copy
1
input
Copy
15 8
1 15 2 14 3 13 4 8 12 5 11 6 10 7 9
output
Copy
48
Note 

In the first example, the suitable pairs of indices are: (1,3)(1,3), (2,2)(2,2), (2,3)(2,3) and (2,4)(2,4).

题意:给出n个数,中位数m,求在这n个数中的任意区间内中位数是n的个数,区间个数是偶数的时候去左边的为 中位数

解题思路:刚开始我以为这是主席树的模板题,第k大,后来听别人说不用这么复杂,因为是n个数互不重复1-n,因为要求的区间里面肯定包含了m,所以我们先求出m的位置,然后我们仔细想

可以得知在这个区间里面要使中位数是m的话,奇数区间大于m的个数与小于m的个数是一样的,偶数区间是大于m的个数比小于m的个数多1,所以我们用map记录比m大和小的个数,我们先从

m的位置从右边遍历求出区间大于小于m的情况,用map 存大于m和小于m的差值,这样比较方便,比如mp[0]=1,说明右边大于m和小于m的区间个数相等的区间有1个,比如mp[-1]=2,说明右边

大于m比小于m少一个的区间个数有2个,以此类推,然后我们再此遍历左边,如果左边大于m的个数是1的话,奇数区间那么我就要右边小于m的个数为1,也就是mp[-1],偶数区间就要右边大于m

小于m个数相等,也就是mp[0],从而推出式子  cnt记录大于小于m的个数 sum=sum+mp[-cnt]+mp[1-cnt];

#include<cstdio>
#include<iostream>
#include<map>
using namespace std;
typedef long long ll;
int main()
{
map<ll,ll> mp;
ll m,n,a[];
cin>>n>>m;
int pos;
for(int i=;i<n;i++)
{
cin>>a[i];
if(a[i]==m)
pos=i;
}
int cnt=;
for(int i=pos;i<n;i++)
{
if(a[i]>m) cnt++;
if(a[i]<m) cnt--;
mp[cnt]++;
}
ll sum=;
cnt=;
for(int i=pos;i>=;i--)
{
if(a[i]>m) cnt++;
if(a[i]<m) cnt--;
sum=sum+mp[-cnt]+mp[-cnt];
}
cout<<sum;
}
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