考虑逆序对的产生条件,是存在两个数\(i,j\)满足\(i < j,a_i > a_j\)
故设\(dp_{i,j}\)表示\(a_i>a_j\)的概率,每一次一个交换操作时\(O(n)\)地更新即可。
AGC030D就在模意义下运算,最后就乘上\(2^Q\)就行了
看着好简单啊就是想不到
#include<iostream>
#include<cstdio>
#include<cstdlib>
#include<ctime>
#include<cctype>
#include<algorithm>
#include<cstring>
#include<iomanip>
#include<queue>
#include<map>
#include<set>
#include<bitset>
#include<stack>
#include<vector>
#include<cmath>
#define ld long double
//This code is written by Itst
using namespace std;
inline int read(){
int a = 0;
char c = getchar();
bool f = 0;
while(!isdigit(c) && c != EOF){
if(c == '-')
f = 1;
c = getchar();
}
if(c == EOF)
exit(0);
while(isdigit(c)){
a = a * 10 + c - 48;
c = getchar();
}
return f ? -a : a;
}
ld dp[1010][1010];
int num[1010] , N , M;
int main(){
#ifndef ONLINE_JUDGE
freopen("in","r",stdin);
//freopen("out","w",stdout);
#endif
N = read();
M = read();
for(int i = 1 ; i <= N ; ++i)
num[i] = read();
for(int i = 1 ; i <= N ; ++i)
for(int j = i - 1 ; j ; --j){
dp[i][j] = num[i] > num[j];
dp[j][i] = num[j] > num[i];
}
for(int i = 1 ; i <= M ; ++i){
int a = read() , b = read();
for(int j = 1 ; j <= N ; ++j)
if(j != a && j != b){
dp[j][a] = dp[j][b] = (dp[j][a] + dp[j][b]) * 0.5;
dp[a][j] = dp[b][j] = (dp[a][j] + dp[b][j]) * 0.5;
}
dp[a][b] = dp[b][a] = (dp[a][b] + dp[b][a]) * 0.5;
}
ld sum = 0;
for(int i = 1 ; i <= N ; ++i)
for(int j = i - 1 ; j ; --j)
sum += dp[j][i];
cout << fixed << setprecision(8) << sum;
return 0;
}