Luogu P3355 骑士共存问题

时间:2023-03-09 21:56:01
Luogu P3355 骑士共存问题

题目链接 \(Click\) \(Here\)

二分图最大独立集。对任意两个可以相互攻击的点,我们可以选其中一个。对于不会互相攻击的,可以全部选中。所以我们只需要求出最大匹配,根据定理,二分图最大独立集等于点数减去最大匹配,就得到了答案。

#include <bits/stdc++.h>

using namespace std;

const int N = 80010;

const int M = 800010;

const int INF = 0x3f3f3f3f;

int n, m, ban[210][210];

int cnt = -1, head[N];

int mv[8][2] = {{2, 1},{2, -1},{1, 2},{1, -2},{-2, 1},{-2, -1},{-1, 2},{-1, -2}};

bool in_map (int x, int y) {return 1 <= x && x <= n && 1 <= y && y <= n;}

struct edge {

	int nxt, to, f;

}e[M];

void add_edge (int from, int to, int flw) {

	e[++cnt].nxt = head[from];

	e[cnt].to = to;

	e[cnt].f = flw;

	head[from] = cnt;

}

void add_len (int u, int v, int f) {

	add_edge (u, v, f);

	add_edge (v, u, 0);

}

int nd1 (int x, int y) {return n * n * 0 + (x - 1) * n + y;}

int nd2 (int x, int y) {return n * n * 1 + (x - 1) * n + y;}

queue <int> q;

int cur[N], deep[N];

bool bfs (int s, int t) {

	memcpy (cur, head, sizeof (head));

	memset (deep, 0x3f, sizeof (deep));

	q.push (s); deep[s] = 0;

	while (!q.empty ()) {

		int u = q.front (); q.pop ();

		for (int i = head[u]; ~i; i = e[i].nxt) {

			int v = e[i].to;

			if (deep[v] == INF && e[i].f) {

				deep[v] = deep[u] + 1;

				q.push (v);

			}

		}

	}

	return deep[t] != INF;

}

int dfs (int u, int t, int lim) {

	if (u == t || !lim) {

		return lim;

	}

	int tmp = 0, flow = 0;

	for (int &i = cur[u]; ~i; i = e[i].nxt) {

		int v = e[i].to;

		if (deep[v] == deep[u] + 1) {

			tmp = dfs (v, t, min (lim, e[i].f));

			lim -= tmp;

			flow += tmp;

			e[i ^ 0].f -= tmp;

			e[i ^ 1].f += tmp;

			if (!lim) break;

		}

	}

	return flow;

}

int main () {

	memset (head, -1, sizeof (head));

	cin >> n >> m;

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

		int x, y;

		cin >> x >> y;

		ban[x][y] = true;

	}

	int s = n * n * 2 + 1, t = n * n * 2 + 2;

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

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

			if (ban[i][j]) continue;

			add_len (s, nd1 (i, j), 1);

			add_len (nd2 (i, j), t, 1);

			for (int k = 0; k < 8; ++k) {

				int tx = i + mv[k][0];

				int ty = j + mv[k][1];

				if (in_map (tx, ty) && !ban[tx][ty]) {

					add_len (nd1 (i, j), nd2 (tx, ty), 1);

				}

			}

		}

	}

	int max_flow = 0;

	while (bfs (s, t)) {

		getchar ();

		max_flow += dfs (s, t, INF);

	}

	// printf ("max_flow = %d\n", max_flow);

	cout << n * n - m - max_flow / 2 << endl;

}

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