Katu Puzzle(POJ3678+2-SAT问题+tarjan缩点)

时间:2023-03-09 17:01:47
Katu Puzzle(POJ3678+2-SAT问题+tarjan缩点)

题目链接:http://poj.org/problem?id=3678

题目:

Katu Puzzle(POJ3678+2-SAT问题+tarjan缩点)

Katu Puzzle(POJ3678+2-SAT问题+tarjan缩点)

题意:给你a,b,c,op,op为逻辑运算符或、与、异或,使得a op b = c,让你判断这些运算符是否存在矛盾,不存在输出YES,存在输出NO。

思路:2-SAT问题。2-SAT问题一般都是每个节点有两种选择,并且在节点中间将存在一定的限制,譬如a为1,那么b必须为1或a为0,b必须为1……而且当一个命题存在时,它的逆否命题必然存在(此处由命题为真,则其逆否命题也为真得证)。我们通过将这些关系转换成有向的边,通过tarjan缩点,我们可以通过判断同一个节点是否它的两种选择在同一个SCC中来决定是否存在矛盾。此题我们假设i为i节点取1,i+n为i节点取0,然后对c和op进行分类讨论,进行建图跑tarjan,从而解决此题。

代码实现如下:

 #include <set>

 #include <map>

 #include <queue>

 #include <stack>

 #include <cmath>

 #include <bitset>

 #include <cstdio>

 #include <string>

 #include <vector>

 #include <cstdlib>

 #include <cstring>

 #include <iostream>

 #include <algorithm>

 using namespace std;

 typedef long long ll;

 typedef pair<ll, ll> pll;

 typedef pair<ll, int> pli;

 typedef pair<int, ll> pil;;

 typedef pair<int, int> pii;

 typedef unsigned long long ull;

 #define lson i<<1

 #define rson i<<1|1

 #define bug printf("*********\n");

 #define FIN freopen("D://code//in.txt", "r", stdin);

 #define debug(x) cout<<"["<<x<<"]" <<endl;

 #define IO ios::sync_with_stdio(false),cin.tie(0);

 const double eps = 1e-;

 const int mod = ;

 const int maxn = 1e6 + ;

 const double pi = acos(-);

 const int inf = 0x3f3f3f3f;

 const ll INF = 0x3f3f3f3f3f3f3f;

 int n, m, a, b, c, tot, cnt, num, top;

 char op[];

 int head[<<];

 int vis[<<], dfn[<<], low[<<], stc[<<], p[<<];

 struct edge {

     int v, next;

 }ed[maxn<<];

 void addedge(int u, int v) {

     ed[tot].v = v;

     ed[tot].next = head[u];

     head[u] = tot++;

 }

 void tarjan(int x) {

     dfn[x] = low[x] = ++num;

     stc[++top] = x, vis[x] = ;

     for(int i = head[x]; ~i; i = ed[i].next) {

         int y = ed[i].v;

         if(!dfn[y]) {

             tarjan(y);

             low[x] = min(low[x], low[y]);

         } else if(vis[y]) {

             low[x] = min(low[x], low[y]);

         }

     }

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

         int y; cnt++;

         do {

             y = stc[top--], vis[y] = ;

             p[y] = cnt;

         } while(x != y);

     }

 }

 int main() {

     //FIN;

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

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

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

         scanf("%d%d%d%s", &a, &b, &c, op);

         if(op[] == 'A') {

             if(c == ) {

                 addedge(a + n, a);

                 addedge(b + n, b);

             } else {

                 addedge(a, b + n);

                 addedge(b, a + n);

             }

         } else if(op[] == 'O') {

             if(c == ) {

                 addedge(a + n, b);

                 addedge(b + n, a);

             } else {

                 addedge(a, a + n);

                 addedge(b, b + n);

             }

         } else {

             if(c == ) {

                 addedge(a, b + n);

                 addedge(b, a + n);

                 addedge(a + n, b);

                 addedge(b + n, a);

             } else {

                 addedge(a, b);

                 addedge(b, a);

                 addedge(a + n, b + n);

                 addedge(b + n, a + n);

             }

         }

     }

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

         if(!dfn[i]) {

             tarjan(i);

         }

     }

     int flag = ;

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

         if(p[i] == p[i+n]) {

             flag = ;

             break;

         }

     }

     if(flag) puts("YES");

     else puts("NO");

     return ;

 }