题目链接
题解
看到异或和最大就应该想到01 trie树
我们记\(S_i\)为前i项的异或和
那么我们的目的是最大化\(S_n\)^\(x\)^\(S_{j-1}\) \((l <= j <= r)\) (注意是\(j-1\), 所以l和r都要减1)
\(S_n\)^\(x\)已经固定, 那么我们可以把\(S_j\)放入trie树搞
那么怎么处理区间呢?
类似主席树
记录一下\([1-i]\)每个节点被多少个数经过
那么两棵trie树相减,就得到了 \([l-r]\)这段区间的信息
然后就是经典的模型了
Code
#include<bits/stdc++.h>
const int N = 600010, M = 25;
#define LL long long
#define RG register
int ch[N*30][2], sum[N*30], root[N], cnt, tot, ans;
using namespace std;
inline int gi() {
RG int x = 0; RG char c = getchar(); bool f = 0;
while (c != '-' && (c < '0' || c > '9')) c = getchar();
if (c == '-') c = getchar(), f = 1;
while (c >= '0' && c <= '9') x = x*10+c-'0', c = getchar();
return f ? -x : x;
}
void insert(int &now, int x, int dep) {
sum[++cnt] = sum[now]+1;
ch[cnt][0] = ch[now][0]; ch[cnt][1] = ch[now][1];
now = cnt;
if (dep < 0) return ;
insert(ch[now][(x >> dep) & 1], x, dep-1);
return ;
}
void query(int rt1, int rt2, int x, int dep) {
if (dep < 0) return ;
int k = (x >> dep)&1;
if (sum[ch[rt2][k^1]]-sum[ch[rt1][k^1]] > 0) {
ans |= (1 << dep);
query(ch[rt1][k^1], ch[rt2][k^1], x, dep-1);
}
else query(ch[rt1][k], ch[rt2][k], x, dep-1);
return ;
}
int main() {
//freopen(".in", "r", stdin);
//freopen(".out", "w", stdout);
int n = gi(), m = gi();
for (int i = 1; i <= n; i++) {
int x = gi();
tot ^= x; root[i] = root[i-1];
insert(root[i], tot, M-1);
}
for (int i = 1; i <= m; i++) {
char c = getchar();
while (c != 'A' && c != 'Q') c = getchar();
if (c == 'A') {
int x = gi();
tot ^= x;
root[n+1] = root[n];
insert(root[++n], tot, M-1);
}
else {
int l = gi()-1, r = gi()-1, x = gi();
ans = 0;
query(root[l-1], root[r], tot^x, M-1);
if (!l) ans = max(ans, tot^x);
printf("%d\n", ans);
}
}
return 0;
}