【hdu 1536】S-Nim
Time Limit: 5000/1000 MS (Java/Others) Memory Limit: 65536/32768 K (Java/Others)
Total Submission(s): 7410 Accepted Submission(s): 3127
Problem Description
Arthur and his sister Caroll have been playing a game called Nim for some time now. Nim is played as follows:
The starting position has a number of heaps, all containing some, not necessarily equal, number of beads.
The players take turns chosing a heap and removing a positive number of beads from it.
The first player not able to make a move, loses.
Arthur and Caroll really enjoyed playing this simple game until they recently learned an easy way to always be able to find the best move:
Xor the number of beads in the heaps in the current position (i.e. if we have 2, 4 and 7 the xor-sum will be 1 as 2 xor 4 xor 7 = 1).
If the xor-sum is 0, too bad, you will lose.
Otherwise, move such that the xor-sum becomes 0. This is always possible.
It is quite easy to convince oneself that this works. Consider these facts:
The player that takes the last bead wins.
After the winning player’s last move the xor-sum will be 0.
The xor-sum will change after every move.
Which means that if you make sure that the xor-sum always is 0 when you have made your move, your opponent will never be able to win, and, thus, you will win.
Understandibly it is no fun to play a game when both players know how to play perfectly (ignorance is bliss). Fourtunately, Arthur and Caroll soon came up with a similar game, S-Nim, that seemed to solve this problem. Each player is now only allowed to remove a number of beads in some predefined set S, e.g. if we have S =(2, 5) each player is only allowed to remove 2 or 5 beads. Now it is not always possible to make the xor-sum 0 and, thus, the strategy above is useless. Or is it?
your job is to write a program that determines if a position of S-Nim is a losing or a winning position. A position is a winning position if there is at least one move to a losing position. A position is a losing position if there are no moves to a losing position. This means, as expected, that a position with no legal moves is a losing position.
Input
Input consists of a number of test cases. For each test case: The first line contains a number k (0 < k ≤ 100 describing the size of S, followed by k numbers si (0 < si ≤ 10000) describing S. The second line contains a number m (0 < m ≤ 100) describing the number of positions to evaluate. The next m lines each contain a number l (0 < l ≤ 100) describing the number of heaps and l numbers hi (0 ≤ hi ≤ 10000) describing the number of beads in the heaps. The last test case is followed by a 0 on a line of its own.
Output
For each position: If the described position is a winning position print a ‘W’.If the described position is a losing position print an ‘L’. Print a newline after each test case.
Sample Input
2 2 5 3 2 5 12 3 2 4 7 4 2 3 7 12 5 1 2 3 4 5 3 2 5 12 3 2 4 7 4 2 3 7 12 0
Sample Output
LWW
WWL
【题目链接】:http://acm.hdu.edu.cn/showproblem.php?pid=1536
【题解】
/* s是个集合! 每次只能拿走s集合里面的数字大小的个数; 它没有说是有序的.. 所以从小到大枚举不能直接break;(先排序就可以了); 算出每组S的对应的sg函数(0..10000); 然后看看所有的h的异或值是不是0,是0就先手输; 否则先手赢; 子游戏的sg函数是能够叠加的(用抑或叠加)就变成组合博弈了(听起来很高端吧~); */
【完整代码】
#include <bits/stdc++.h> using namespace std; #define rep1(i,a,b) for (int i = a;i <= b;i++) #define rei(x) scanf("%d",&x) const int MAXK = 1e2+10; const int MAXH = 1e4+10; int k,s[MAXK],sg[MAXH],m,l,h[MAXK]; bool flag[MAXK]; int main() { //freopen("D:\\rush.txt","r",stdin); rei(k); while (k!=0) { rep1(i,1,k) rei(s[i]); sort(s+1,s+1+k); sg[0] = 0; rep1(i,1,10000) { rep1(j,0,100) flag[j] = false; for (int j = 1;i-s[j]>=0 && j<=k;j++) flag[sg[i-s[j]]] = true; rep1(j,0,100) if (!flag[j]) { sg[i] = j; break; } } rei(m); rep1(i,1,m) { int temp = 0; rei(l); rep1(j,1,l) { rei(h[j]); temp = temp^sg[h[j]]; } if (temp == 0) printf("L"); else printf("W"); } puts(""); rei(k); } return 0; }
- HDU 1536 S-Nim
- HDU-1536-S-Nim
- hdu 1536——S-Nim
- hdu_1536_S-Nim(DFS_SG博弈)
- hdu 1536 S-Nim(SG函数)
- hdu 1536 S-Nim (sg)
- hdu 1536 S-Nim
- hdu_1536_S-Nim(DFS_SG博弈)
- HDU 1536 S-Nim
- HDU 1536 S-Nim
- hdu 1536 S-Nim(SG函数)
- hdu 1536 S-Nim
- poj 2960,hdu 1536 S-NIM 博弈
- HDU 1536 S-Nim
- hdu 1536 S-Nim_求sg值模版
- hdu 1536 S-Nim
- hdu 1536 S-Nim(SG函数)
- hdu 1536 S-Nim_求sg值模版
- HDU 1536 S-Nim(尼姆博弈)
- hdu 1536 S-Nim(SG函数)