hdu 4609 3-idiots

题意：

给出\(A_i\)，问随机选择一个三元子集，选择的数字构成三角形的三边长的概率。

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一开始一直想直接做....

先生成函数求选两个的方案(注意要减去两次选择同一个的，然后/2)，然后统计三角形个数。

枚举三角形最长边，求\(i+j>k,i<k,j<k\)的方案数。后两个条件减去不合法的。

不合法很好统计 \(i \ge k \rightarrow i+j > k\)

#include <iostream>

#include <cstdio>

#include <cstring>

#include <algorithm>

#include <cmath>

using namespace std;

typedef long long ll;

const int N = (1<<18) + 5;

const double PI = acos(-1.0);

inline int read() {

    char c=getchar(); int x=0,f=1;

    while(c<'0'||c>'9') {if(c=='-')f=-1;c=getchar();}

    while(c>='0'&&c<='9') {x=x*10+c-'0';c=getchar();}

    return x*f;

}

struct meow{

    double x, y;

    meow(double a=0, double b=0):x(a), y(b){}

};

meow operator +(meow a, meow b) {return meow(a.x+b.x, a.y+b.y);}

meow operator -(meow a, meow b) {return meow(a.x-b.x, a.y-b.y);}

meow operator *(meow a, meow b) {return meow(a.x*b.x-a.y*b.y, a.x*b.y+a.y*b.x);}

meow conj(meow a) {return meow(a.x, -a.y);}

typedef meow cd;

namespace fft {

	int n, rev[N];

	cd omega[N], omegaInv[N];

	void init(int lim) {

		n = 1; int k = 0; while(n < lim) n <<= 1, k++;

		for(int i=0; i<n; i++) rev[i] = (rev[i>>1]>>1) | ((i&1)<<(k-1));

		for(int i=0; i<n; i++) {

			omega[i] = cd(cos(2*PI/n*i), sin(2*PI/n*i));

			omegaInv[i] = conj(omega[i]);

		}

	}

	void dft(cd *a, int flag) {

		cd *w = flag == 1 ? omega : omegaInv;

		for(int i=0; i<n; i++) if(i < rev[i]) swap(a[i], a[rev[i]]);

		for(int l=2; l<=n; l<<=1) {

			int m = l>>1;

			for(cd *p = a; p != a+n; p += l)

				for(int k=0; k<m; k++) {

					cd t = w[n/l*k] * p[k+m];

					p[k+m] = p[k] - t;

					p[k] = p[k] + t;

				}

		}

		if(flag == -1) for(int i=0; i<n; i++) a[i].x /= n;

	}

}

int n, q[N]; ll s[N];

cd a[N];

int main() {

	freopen("in", "r", stdin);

	int T = read();

	while(T--) {

		n = read(); int m = 0;

		for(int i=1; i<=n; i++) q[i] = read(), m = max(m, q[i]);

		fft::init(m+m+1);

		memset(a, 0, sizeof(a));

		for(int i=1; i<=n; i++) a[q[i]].x ++;

		fft::dft(a, 1);

		for(int i=0; i<fft::n; i++) a[i] = a[i] * a[i];

		fft::dft(a, -1);

		for(int i=1; i <= m<<1; i++) s[i] = (ll) floor(a[i].x + 0.5);

		for(int i=1; i <= n; i++) s[q[i]<<1] --;

		for(int i=1; i <= m<<1; i++) s[i] = s[i-1] + (s[i]>>1);

		sort(q+1, q+1+n);

		ll ans = 0, tot = (ll) n * (n-1) * (n-2) / 6;

		for(int i=1; i<=n; i++) {

			//ll t = s[m<<1] - s[q[i]] - (ll) (n-i) * (i-1) - (n-1) - (ll) (n-i) * (n-i-1) / 2;

			ll t = s[m<<1] - s[q[i]] - (ll) (n-i+1) * (n-1) + (ll) (n-i+1) * (n-i) / 2;

			ans += t;

		}

		printf("%.7lf\n", (double) ans / tot);

	}

}