http://poj.org/problem?id=3177

又写了一遍手动栈。。。

把边双都缩点，缩成一棵树，答案就是树中度数为1的点的个数除2上取整。

为什么呢？因为1个度数为1的点的树需要多连0条边，2个度数为1的点的树需要多连1条边，3个度数为1的点的树需要多连2条边。

然后对于n(n>3)个度数为1的点的树，连一次边后再缩点能变成有n-2个度数为1的点的树。

无向图边双跟有向图强连通分量的求法很像喔，重点在于特判后继节点是否是自己的father连过来的边。

#include<cstdio>

#include<bitset>

#include<cstring>

#include<algorithm>

using namespace std;

const int N = 5003;

const int M = 10003;

bitset <N> inst;

struct node {int nxt, to;} E[M << 1];

int cnt = 1, tot = 0, bel[N], point[N], cur[N], st[N], sta[N], top, statop, fa[N], low[N], dfn[N], n, m, fae[N];

void ins(int u, int v) {E[++cnt] = (node) {point[u], v}; point[u] = cnt;}

void tarjan(int x) {

	st[top = 1] = x;

	while (top) {

		int u = st[top];

		if (!dfn[u]) {

			inst[sta[++statop] = u] = 1;

			dfn[u] = low[u] = ++cnt;

		}

		if (cur[u]) {

			if (cur[u] == fae[u]) {cur[u] = E[cur[u]].nxt; continue;}

			int v = E[cur[u]].to;

			if (inst[v]) low[u] = min(low[u], dfn[v]);

			else if (!dfn[v]) fa[st[++top] = v] = u, fae[v] = cur[u] ^ 1;

			cur[u] = E[cur[u]].nxt;

		} else {

			low[fa[u]] = min(low[fa[u]], low[u]);

			if (dfn[u] == low[u]) {

				++tot;

				while (sta[statop] != u) {

					bel[sta[statop]] = tot;

					inst[sta[statop]] = 0;

					--statop;

				}

				bel[u] = tot;

				inst[u] = 0;

				--statop;

			}

			--top;

		}

	}

}

int du[N];

int main() {

	scanf("%d%d", &n, &m);

	int u, v;

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

		scanf("%d%d", &u, &v);

		ins(u, v); ins(v, u);

	}

	for (int i = 1; i <= n; ++i) cur[i] = point[i];

	cnt = 0;

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

		if (!dfn[i])

			tarjan(i);

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

		for (int j = point[i]; j; j = E[j].nxt)

			if (bel[i] != bel[E[j].to] && E[j].to > i)

				++du[bel[i]], ++du[bel[E[j].to]];

	int ret = 0;

	for (int i = 1; i <= tot; ++i)

		if (du[i] == 1) ++ret;

	printf("%d\n", (ret + 1) >> 1);

	return 0;

}