题目传送门

https://lydsy.com/JudgeOnline/problem.php?id=1004

题解

直接 Burnside 引理就可以了。

要计算不动点的个数，那么对于一个长度为 \(x\) 的循环，必须全部是红色、蓝色、绿色三种。

所以显然可以 DP。令 \(dp[i][j][k]\) 表示前 \(i\) 个循环，\(j\) 张牌选了红色，\(k\) 张牌选了蓝色，剩下的选了绿色的方案数。背包转移就可以了。

最后记得要比 \(m\) 个置换多算一个 \(f_i = i\) 的排列，也就是不动的情况。

---

代码如下，时间复杂度 \(O(mn^3)\)。

#include<bits/stdc++.h>

#define fec(i, x, y) (int i = head[x], y = g[i].to; i; i = g[i].ne, y = g[i].to)

#define dbg(...) fprintf(stderr, __VA_ARGS__)

#define File(x) freopen(#x".in", "r", stdin), freopen(#x".out", "w", stdout)

#define fi first

#define se second

#define pb push_back

template<typename A, typename B> inline char smax(A &a, const B &b) {return a < b ? a = b, 1 : 0;}

template<typename A, typename B> inline char smin(A &a, const B &b) {return b < a ? a = b, 1 : 0;}

typedef long long ll; typedef unsigned long long ull; typedef std::pair<int, int> pii;

template<typename I> inline void read(I &x) {

	int f = 0, c;

	while (!isdigit(c = getchar())) c == '-' ? f = 1 : 0;

	x = c & 15;

	while (isdigit(c = getchar())) x = (x << 1) + (x << 3) + (c & 15);

	f ? x = -x : 0;

}

const int N = 60 + 7;

int n, nr, nb, ng, m, P;

int fa[N], sz[N], siz[N], s[N], dp[N][N][N];

inline int find(int x) { return fa[x] == x ? x : fa[x] = find(fa[x]); }

inline void merge(int x, int y) {

	x = find(x), y = find(y);

	if (x == y) return;

	if (sz[x] < sz[y]) std::swap(x, y);

	fa[y] = x, smax(sz[x], sz[y] + 1), siz[x] += siz[y];

}

inline int smod(int x) { return x >= P ? x - P : x; }

inline void sadd(int &x, const int &y) { x += y; x >= P ? x -= P : x; }

inline int fpow(int x, int y) {

	int ans = 1;

	for (; y; y >>= 1, x = (ll)x * x % P) if (y & 1) ans = (ll)ans * x % P;

	return ans;

}

inline int DP() {

	memset(dp, 0, sizeof(dp));

	dp[0][0][0] = 1;

	int i = 0;

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

		if (find(g) != g) continue;

		++i;

		s[i] = s[i - 1] + siz[g];

//		dbg("***** i = %d\n", i);

		for (int j = 0; j <= std::min(s[i], nr); ++j)

			for (int k = 0; j + k <= s[i] && k <= nb; ++k)

				if (s[i] - j - k <= ng) {

					if (j >= siz[g]) sadd(dp[i][j][k], dp[i - 1][j - siz[g]][k]);

					if (k >= siz[g]) sadd(dp[i][j][k], dp[i - 1][j][k - siz[g]]);

					if (s[i] - j - k >= siz[g]) sadd(dp[i][j][k], dp[i - 1][j][k]);

//					dbg("dp[%d][%d][%d] = %d, siz[g] = %d\n", i, j, k, dp[i][j][k], siz[g]);

				}

	}

	return dp[i][nr][nb];

}

inline void work() {

	for (int i = 1; i <= n; ++i) fa[i] = i, sz[i] = siz[i] = 1;

	int ans = DP();

	for (int k = 1; k <= m; ++k) {

		for (int i = 1, x; i <= n; ++i) read(x), merge(i, x);

		sadd(ans, DP());

	}

	ans = (ll)ans * fpow(m + 1, P - 2) % P;

	printf("%d\n", ans);

}

inline void init() {

	read(nr), read(nb), read(ng);

	n = nr + nb + ng;

	read(m), read(P);

}

int main() {

#ifdef hzhkk

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

#endif

	init();

	work();

	fclose(stdin), fclose(stdout);

	return 0;

}