- 模数 1e9 的神奇求行列式:
#include <bits/stdc++.h>
using namespace std; const int maxn = 1e2, mod = 1e9;
#define n N
int n, a[maxn][maxn]; inline int det()
{
//cout << n << endl;
int ans = 1; for (int i = 1; i <= n; i++)
{
for (int k = i + 1; k <= n; k++) while (a[k][i])
{
int d = a[i][i] / a[k][i];
for (int j = i; j <= n; j++) a[i][j] = (a[i][j] - 1ll * d * a[k][j] % mod + mod) % mod;
swap(a[i], a[k]), ans *= -1;
}
ans = (ans * 1ll * a[i][i]) % mod/*, cout << ans << endl*/;
}
return (ans % mod + mod) % mod;
}
#undef n
inline void add(int u, int v) { a[u][v]--, a[v][u]--, a[u][u]++, a[v][v]++; /*cout << 'H' << u << v << endl;*/ }
char s[maxn][maxn]; int n, m, num[maxn][maxn]; int main()
{
ios::sync_with_stdio(0), cin.tie(0), cin >> n >> m;
for (int i = 1; i <= n; i++) for (int j = 1; j <= m; j++) { cin >> s[i][j]; if (s[i][j] == '.') num[i][j] = ++N; }
for (int i = 1; i <= n; i++) for (int j = 1; j <= m; j++) if (num[i][j])
{
if (num[i][j + 1]) add(num[i][j], num[i][j + 1]); if (num[i + 1][j]) add(num[i][j], num[i + 1][j]);
}
N--, cout << det() << endl;
}
- 有标号联通无向图计数中的这个卷积:
[frac{f_n}{(n-1)!}=sum_{i=1}^n frac{g_i}{(i-1)!} cdot frac{f_{n-i}}{(n-i)!}
]
可以导出 (A=B imes C) 从而推出 (B= A imes C^{-1}), 因为 ((-1)!=+infty),所以上面的式子可以改写为从 0 开始求和(当然还是整数的方程辣),并且 (C_0=1), (C) 存在逆元.