标签:基第 them XOR int number HDU3949 choose each
Problem Description
XOR is a kind of bit operator, we define that as follow: for two binary base number A and B, let C=A XOR B, then for each bit of C, we can get its value by check the digit of corresponding position in A and B. And for each digit, 1 XOR 1 = 0, 1 XOR 0 = 1, 0 XOR 1 = 1, 0 XOR 0 = 0. And we simply write this operator as ^, like 3 ^ 1 = 2,4 ^ 3 = 7. XOR is an amazing operator and this is a question about XOR. We can choose several numbers and do XOR operatorion to them one by one, then we get another number. For example, if we choose 2,3 and 4, we can get 2^3^4=5. Now, you are given N numbers, and you can choose some of them(even a single number) to do XOR on them, and you can get many different numbers. Now I want you tell me which number is the K-th smallest number among them.Input
First line of the input is a single integer T(T<=30), indicates there are T test cases.For each test case, the first line is an integer N(1<=N<=10000), the number of numbers below. The second line contains N integers (each number is between 1 and 10^18). The third line is a number Q(1<=Q<=10000), the number of queries. The fourth line contains Q numbers(each number is between 1 and 10^18) K1,K2,......KQ.
Output
For each test case,first output Case #C: in a single line,C means the number of the test case which is from 1 to T. Then for each query, you should output a single line contains the Ki-th smallest number in them, if there are less than Ki different numbers, output -1.Sample Input
2 2 1 2 4 1 2 3 4 3 1 2 3 5 1 2 3 4 5Sample Output
Case #1: 1 2 3 -1 Case #2: 0 1 2 3 -1 Hint If you choose a single number, the result you get is the number you choose. Using long long instead of int because of the result may exceed 2^31-1. Author elfnessSource
题目大意:给出$n$个数,问两两异或后第$k$小的数是多少
看了很多篇博客,发现都是在围绕着高斯消元解xor方程组来的。
然后我惊讶的发现,原来高斯消元解xor解方程组其实就是求出线性基然后再消元
通过消元保证线性基内有元素的每一列只有一个$1$
然后把$k$二进制分解,如果第$i$是$1$就异或上第$i$个有解的线性基
同时要特判$0$的情况,若线性基的大小与元素的大小相同则不能异或为$0$(线性无关),否则可以异或为零,这时我们只要求出第$k-1$小就可以了
这里把$k$二进制分解后的$0/1$实际对应了线性基中元素选/不选,可以证明这样一定是对的
#include<cstdio>
#include<cstring>
#include<algorithm>
#define int long long
using namespace std;
const int MAXN = 1e5 + 10, B = 31;
inline int read() {
char c = getchar(); int x = 0, f = 1;
while(c < '0' || c > '9') {if(c == '-') f = -1; c = getchar();}
while(c >= '0' && c <= '9') x = x * 10 + c - '0', c = getchar();
return x * f;
}
int P[MAXN];
void Insert(int x) {
for(int i = B; i >= 0; i--) {
if((x >> i) & 1) {
if(P[i]) x = x ^ P[i];
else {P[i] = x; return ;}
}
}
}
void Debug(int *a, int N) {
for(int i = 0; i <= N; i++) {
for(int j = 0; j <= B; j++)
printf("%d ", (P[i] >> j) & 1);
puts("");
}
puts("********");
}
main() {
int QwQ = read();
for(int test = 1; test <= QwQ; test++) {
printf("Case #%I64d:\n", test);
memset(P, 0, sizeof(P));
int N = read();
for(int i = 1; i <= N; i++)
Insert(read());
for(int i = B; i >= 0; i--) {
if(P[i]) {
for(int j = i + 1; j <= B; j++)
if((P[j] >> i) & 1) P[j] ^= P[i];
}
}
int now = 0;
for(int i = 0; i <= B; i++)
if(P[i])
P[now++] = P[i];
int Q = read();
while(Q--) {
int K = read(), ans = 0;
if(now != N) K--;
if(K >= (1ll << now)) {puts("-1"); continue;}
for(int i = 0; i <= B; i++)
if((K >> i) & 1)
ans ^= P[i];
printf("%I64d\n", ans);
}
}
}
标签:基第,them,XOR,int,number,HDU3949,choose,each 来源: https://blog.51cto.com/u_15239936/2868101
本站声明: 1. iCode9 技术分享网(下文简称本站)提供的所有内容,仅供技术学习、探讨和分享; 2. 关于本站的所有留言、评论、转载及引用,纯属内容发起人的个人观点,与本站观点和立场无关; 3. 关于本站的所有言论和文字,纯属内容发起人的个人观点,与本站观点和立场无关; 4. 本站文章均是网友提供,不完全保证技术分享内容的完整性、准确性、时效性、风险性和版权归属;如您发现该文章侵犯了您的权益,可联系我们第一时间进行删除; 5. 本站为非盈利性的个人网站,所有内容不会用来进行牟利,也不会利用任何形式的广告来间接获益,纯粹是为了广大技术爱好者提供技术内容和技术思想的分享性交流网站。