HDU 3032 Nim or not Nim? (sg函数求解)
Nim or not Nim?
Nim is usually played as a misere game, in which the player to take the last object loses. Nim can also be played as a normal play game, which means that the person who makes the last move (i.e., who takes the last object) wins. This is called normal play because most games follow this convention, even though Nim usually does not.
Alice and Bob is tired of playing Nim under the standard rule, so they make a difference by also allowing the player to separate one of the heaps into two smaller ones. That is, each turn the player may either remove any number of objects from a heap or separate a heap into two smaller ones, and the one who takes the last object wins.
2 3 2 2 3 2 3 3
Alice Bob
题目大意:
解题思路:Alice和Bob轮流取N堆石子,每堆S[i]个,Alice先。每一次能够从随意一堆中拿走随意个石子,也能够将一堆石子分为两个小堆。先拿完者获胜。
(1 ≤ N ≤ 10^6, 1 ≤ S[i] ≤ 2^31 - 1)
对于一个给定的有向无环图。定义关于图的每一个顶点的Sprague-Grundy函数g例如以下:g(x)=mex{ g(y) | y是x的后继 },这里的g(x)即sg[x]
比如:取石子问题,有1堆n个的石子,每次仅仅能取{1。3,4}个石子。先取完石子者胜利。那么各个数的SG值为多少?
sg[0]=0,
n=1时,能够取走{1}个石子,剩余{0}个。mex{sg[0]}={0}。故sg[1]=1;
n=2时,能够取走{1}个石子。剩余{1}个,mex{sg[1]}={1}。故sg[2]=0;
n=3时。能够取走{1,3}个石子,剩余{2,0}个。mex{sg[2],sg[0]}={0,0},故sg[3]=1;
n=4时,能够取走{1,3,4}个石子。剩余{3,1,0}个,mex{sg[3],sg[1],sg[0]}={1,1,0},故sg[4]=2;
n=5时。能够取走{1,3,4}个石子。剩余{4,2,1}个,mex{sg[4],sg[2],sg[1]}={2,0,1},故sg[5]=3;
以此类推.....
x 0 1 2 3 4 5 6 7 8....
sg[x] 0 1 0 1 2 3 2 0 1....
所以,对于这题:
sg[0]=0
sg[1]=mex{sg[0] }=1
sg[2]=mex{sg[0],sg[1],sg[1,1] }=mex{0,1,1^1}=2;
sg[3]=mex{sg[0],sg[1],sg[2],sg[1,2]}=mex{0,1,2,1^2}=mex{0,1,2,3}=4;
sg[4]=mex{sg[0],sg[1],sg[2],sg[3],sg[1,3],sg[2,2]}=mex{0,1,2,4,5,0}=3;
..............................................................................
能够发现:sg[4*k+1]=4*k+1,sg[4*k+2]=4*k+2, sg[4*k+3]=4*k+4,sg[4*k+4]=4*k+3
解题代码:
#include <iostream> using namespace std; int main(){ int t; cin>>t; while(t-- >0){ int sg=0,n,x; cin>>n; for(int i=0;i<n;i++){ cin>>x; if(x%4==0) sg^=x-1; else if(x%4==3) sg^=x+1; else sg^=x; } if(sg) cout<<"Alice"<<endl; else cout<<"Bob"<<endl; } return 0; }
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