2-sat问题

今天才会2-sat，是不是没有救了...

Anna最近在学sat2...真是心有灵犀啊...

 

参考链接：

　　　　http://wenku.baidu.com/view/afd6c436a32d7375a41780f2.html

 

方法：

　　假如有n对pair，每对pair只能挑选一个，有些人有矛盾，不能让他们在一起

　　对于p1和p2：如果有p1.x和p2.y有矛盾，即如果选择了p1.x就不能选择p2.y，即选择了p1.x就必须选择p2.x，所以就连一条边p1.x->p2.x

　　　　　　　　　　  同理，还有一条p2.y->p1.y

 

　　无解的情况：在一定条件下，某一个人即要被选择又不能被选择

　　　　　　　　即：在图中，存在一对pair p | p.x 和 p.y属于同一个强连通分量

 

hdu 3062 party

#include <stack>
#include <cstdio>
#include <vector>
#include <cstring>
#include <algorithm>
using namespace std;

const int maxn = 2000 + 2;
const int maxm = 4000000 + 2;

stack<int> s;
bool in[maxn];
vector<int> G[maxn];
int n, m, scc, Index, dfn[maxn], low[maxn], belong[maxn];

void tarjan(int now){
    dfn[now] = low[now] = ++ Index;
    in[now] = true, s.push(now);

    for (int i = 0, len = G[now].size(), to; i < len; i ++){
        to = G[now][i];
        if (!dfn[to]){
            tarjan(to);
            low[now] = min(low[now], low[to]);
        }

        else if (in[to])
            low[now] = min(low[now], dfn[to]);
    }

    if (low[now] == dfn[now]){
        ++ scc;    

        int u;
        do {
            u = s.top();
            s.pop(), in[u] = false;
            belong[u] = scc;
        } while (u ^ now);
    }
}

inline void init(){
    memset(low, 0, sizeof low);
    memset(dfn, 0, sizeof dfn);
    memset(in, false, sizeof in);
    Index = scc = 0;
    while (not s.empty())
        s.pop();
    for (int i = 0; i < 2 * n; i ++)
        G[i].clear();

    for (int i = 0, a, b, x, y, g1, g2; i < m; i ++){
        scanf("%d %d %d %d", &a, &b, &g1, &g2);

        x = a * 2 + 1 - g1, y = b * 2 + 1 - g2;
        a = a * 2 + g1, b = b * 2 + g2;

        G[a].push_back(y), G[b].push_back(x);
    }
}

inline bool two_sat(){
    init();
    for (int i = 0; i < n * 2; i ++)
        if (!dfn[i])
            tarjan(i);

    for (int i = 0; i < n; i ++)
        if (belong[i * 2] == belong[i * 2 + 1])
            return false;

    return true;
}

int main(){
    while (scanf("%d %d", &n, &m) == 2)
        puts(two_sat() ? "YES" : "NO");
}

poj 3678

对于每个xi，有两个选择，0还是1，建边的时候要讨论一下

#include <stack>
#include <cstdio>
#include <vector>
#include <cstring>
#include <algorithm>
using namespace std;

const int maxl = 10;
const int maxn = 2000 + 2;

stack<int> s;
bool in[maxn];
char buff[maxl];
vector<int> G[maxn];
int n, m, scc, Index, low[maxn], dfn[maxn], belong[maxn];

inline void init(){
    memset(dfn, 0, sizeof dfn);
    memset(low, 0, sizeof low);
    memset(in, false, sizeof in);
    memset(belong, 0, sizeof belong);
    scc = Index = 0;

    for (int i = 0; i < n * 2; i ++)
        G[i].clear();

    while (!s.empty())
        s.pop();
}

void tarjan(int x){
    dfn[x] = low[x] = ++ Index;
    in[x] = true, s.push(x);

    for (int i = 0, to; i < G[x].size(); i ++){
        to = G[x][i];

        if (!dfn[to]){
            tarjan(to);
            low[x] = min(low[x], low[to]);
        }

        else if (in[to])
            low[x] = min(low[x], dfn[to]);
    }

    if (low[x] == dfn[x]){
        ++ scc;
        
        int u;
        do {
            u = s.top();
            s.pop(), in[u] = false;
            belong[u] = scc;
        } while (u ^ x);
    }
}

inline bool two_sat(){
    for (int i = 0; i < n * 2; i ++)
        if (!dfn[i])
            tarjan(i);

    for (int i = 0; i < n; i ++)
        if (belong[i << 1] == belong[(i << 1) | 1])
            return false;

    return true;
}

inline void link(int u, int v){
    G[u].push_back(v ^ 1);
    G[v].push_back(u ^ 1);
}

inline void type_and(int a, int b, int c){
    if (c){
        link(a << 1, b << 1);
        link(a << 1, (b << 1) | 1);
        link((a << 1) | 1, b << 1);
    }
    else 
        link((a << 1) | 1, (b << 1) | 1);
}

inline void type_or(int a, int b, int c){
    if (!c){
        link(a << 1, (b << 1) | 1);
        link((a << 1) | 1, b << 1);
        link((a << 1) | 1, (b << 1) | 1);    
    }
    else 
        link(a << 1, b << 1);
}

inline void type_xor(int a, int b, int c){
    if (!c){
        link(a << 1, (b << 1) | 1);
        link((a << 1) | 1, b << 1);
    }
    else {
        link(a << 1, b << 1);//0 0
        link((a << 1) | 1, (b << 1) | 1);
    }
}

int main(){
        while (scanf("%d %d", &n, &m) == 2){
        init();

        for (int i = 1, a, b, c; i <= m; i ++){
            scanf("%d %d %d %s", &a, &b, &c, buff);

            if (buff[0] == 'A')
                type_and(a, b, c);

            if (buff[0] == 'O')
                type_or(a, b, c);

            if (buff[0] == 'X')
                type_xor(a, b, c);
        }

        puts(two_sat() ? "YES" : "NO");
    }
}

hdu 3622 bomb

二分答案，用2-sat来check

建图的时候：先处理处每个点的距离

对于任意两轮游戏，有两个放置位置，pair_point1 = {p1, p2}, pair_point2 = {p3, p4};

如果有dis(p1, p4) < d （即有相交的面积)，就有p1 -> p3, p4->p2

#include <cmath>
#include <stack>
#include <cstdio>
#include <vector>
#include <cstring>
#include <algorithm>
#define _d (double)
using namespace std;

const double eps = 1e-4;
const int maxn = 200 + 2;

stack<int> s;
bool in[maxn];
vector<int> G[maxn];
double dis[maxn][maxn];
int n, scc, Index, low[maxn], dfn[maxn], belong[maxn];

struct Point {
    int x, y;
} p[maxn];

inline void init(){
    memset(dfn, 0, sizeof dfn);
    memset(low, 0, sizeof low);
    memset(in, false, sizeof in);
    memset(belong, 0, sizeof belong);
    scc = Index = 0;

    for (int i = 0; i < n; i ++)
        G[i].clear();

    while (!s.empty())
        s.pop();
}

inline double get_dis(Point a, Point b){
    return sqrt(_d (a.x - b.x) * (a.x - b.x) + _d (a.y - b.y) * (a.y - b.y));
}

inline int get_partener(int a){
    return a % 2 == 0 ? a + 1 : a - 1;
}

void tarjan(int x){
    dfn[x] = low[x] = ++ Index;
    in[x] = true, s.push(x);

    for (int i = 0, to; i < G[x].size(); i ++){
        to = G[x][i];

        if (!dfn[to]){
            tarjan(to);
            low[x] = min(low[x], low[to]);
        }

        else if (in[to])
            low[x] = min(low[x], dfn[to]);
    }

    if (low[x] == dfn[x]){
        ++ scc;
        
        int u;
        do {
            u = s.top();
            s.pop(), in[u] = false;
            belong[u] = scc;
        } while (u ^ x);
    }
}

inline int cmp(double x){
    if (fabs(x) < eps)
        return 0;
    return x < 0 ? -1 : 1;
}

inline bool two_sat(double r){
    init();

    double d = r + r;
    for (int i = 0; i < n; i ++)
        for (int j = 0; j < n; j ++)
            if (i / 2 != j / 2 && dis[i][j] < d){
                G[i].push_back(get_partener(j));
                G[j].push_back(get_partener(i));
            }

    for (int i = 0; i < n; i ++)
        if (!dfn[i])
            tarjan(i);

    for (int i = 0; i < n; i ++)
        if (belong[i] == belong[get_partener(i)])
            return false;

    return true;
}

inline double search(){
    double l = 0, r = 10000, mid;
    while (cmp(l - r) == -1){
        mid = (l + r) / 2.0;

        if (two_sat(mid))
            l = mid;
        else 
            r = mid;
    }

    return l;
}

int main(){
    while (~scanf("%d", &n)){
        n *= 2;
        for (int i = 0; i < n; i ++)
            scanf("%d %d", &p[i].x, &p[i].y);

        for (int i = 0; i < n; i ++)
            for (int j = i + 1; j < n; j ++)
                dis[i][j] = dis[j][i] = get_dis(p[i], p[j]);

        printf("%.2f
", search());
    }
}

 

poj 2723

二分答案，用2-sat来check

建图的时候：把每个钥匙拆成两个点，选或者不选，编号对应choose(i)和toss(i)

对于key = {a, b}，有choose(a) -> toss(b), choose(b) -> toss(a)

对于lock = {a, b}，有toss(a) -> choose(b), toss(b) -> choose(a)

 

#include <stack>
#include <cstdio>
#include <vector>
#include <cstring>
#include <algorithm>
using namespace std;

const int maxk = 1200 + 2;
const int maxn = 1024 * 4 + 2;

char ch;
stack<int> s;
bool in[maxn];
vector<int> G[maxn];
int n, m, scc, Index, dfn[maxn], low[maxn], belong[maxn];

struct Pair {
    int a, b;
} key[maxk], lock[maxk << 1];

inline int next_int(){
    do
        ch = getchar();
    while (!(48 <= ch && ch <= 57));

    int ret = 0;
    do {
        ret = ret * 10 + ch - 48;
        ch = getchar();
    } while (48 <= ch && ch <= 57);

    return ret;
}

void tarjan(int now){
    dfn[now] = low[now] = ++ Index;
    in[now] = true, s.push(now);

    for (int i = 0, len = G[now].size(), to; i < len; i ++){
        to = G[now][i];
        if (!dfn[to]){
            tarjan(to);
            low[now] = min(low[now], low[to]);
        }

        else if (in[to])
            low[now] = min(low[now], dfn[to]);
    }

    if (low[now] == dfn[now]){
        ++ scc;    

        int u;
        do {
            u = s.top();
            s.pop(), in[u] = false;
            belong[u] = scc;
        } while (u ^ now);
    }
}

inline void clear(){
    memset(low, 0, sizeof low);
    memset(dfn, 0, sizeof dfn);
    memset(in, false, sizeof in);
    Index = scc = 0;

    while (not s.empty())
        s.pop();

    for (int i = 0; i < 4 * n; i ++)
        G[i].clear();
}

inline bool two_sat(int to){
    clear();

    for (int i = 0; i < n; i ++){
        G[key[i].a * 2].push_back(key[i].b * 2 + 1);
        G[key[i].b * 2].push_back(key[i].a * 2 + 1);
    }

    for (int i = 1; i <= to; i ++){
        G[lock[i].a * 2 + 1].push_back(lock[i].b * 2);
        G[lock[i].b * 2 + 1].push_back(lock[i].a * 2);
    }

    for (int i = 0; i < 4 * n; i ++)
        if (!dfn[i])
            tarjan(i);

    for (int i = 0; i < 2 * n; i ++)
        if (belong[i * 2] == belong[i * 2 + 1])
            return false;
    return true;
}

inline int search(){
    int l = 0, r = m, mid;
    while (l < r){
        mid = (l + r + 1) >> 1;

        if (two_sat(mid))
            l = mid;
        else 
            r = mid - 1;
    }

    return l;
}

int main(){
    while (true){
        n = next_int(), m = next_int();
        if (!n && !m)
            return 0;

        for (int i = 0; i < n; i ++)
            key[i].a = next_int(), key[i].b = next_int();
    
        for (int i = 1; i <= m; i ++)
            lock[i].a = next_int(), lock[i].b = next_int();
        
        printf("%d
", search());
    }
}