题目链接:
题目描述:
给出一串数字(数字区间在[1,88]),要在这串数字中找出一个主题,满足:
1:主题长度大于等于5.
2:主题在文本串中重复出现(或者经过调转出现,调转是主题同时加上或者减去同一个整数)
3:重复主题不能重叠
解题思路:
求调转重复出现的子串,那么主题之间的差值一定是不变的。可以求文本串s中相邻两个数的差值,重新组成一个新的文本串S,然后找S后缀串中最长公共不重叠前缀。rank相邻的后缀串,公共前缀一定最长,但是有可能重叠。我们可以二分主题的长度k,然后验证k是否成立。根据height的性质可知,越相似的后缀串rank相差越小,那么我们可以在height[rank]>=k的相邻区间中,找到i=min(sa[rank]),j=max(sa[rank]),如果j-i>=k.则k成立。
#include <cstdio>
#include <cstring>
#include <iostream>
#include <algorithm>
using namespace std;
typedef long long LL;
const int maxn = ; int sa[maxn], rank[maxn], height[maxn];
int t1[maxn], t2[maxn], r[maxn], c[maxn];
bool cmp (int *str, int a, int b, int k)
{
return str[a]==str[b] && str[a+k]==str[b+k];
}
void da (int *str, int n, int m)
{
n ++;
int *x = t1, *y = t2, i, j;
for (i=; i<m; i++) c[i] = ;
for (i=; i<n; i++) c[x[i]=str[i]] ++;
for (i=; i<m; i++) c[i] += c[i-];
for (i=n-; i>=; i--) sa[-- c[x[i]]] = i;
for (j=; j<=n; j*=)
{
int p = ;
for (i=n-j; i<n; i++) y[p++] = i;
for (i=; i<n; i++) if (sa[i] >= j) y[p++] = sa[i] - j; for (i=; i<m; i++) c[i] = ;
for (i=; i<n; i++) c[x[y[i]]] ++;
for (i=; i<m; i++) c[i] += c[i-];
for (i=n-; i>=; i--) sa[-- c[x[y[i]]]] = y[i]; swap (x, y);
p = ;
x[sa[]] = ;
for (int i=; i<n; i++)//i是rank
x[sa[i]] = cmp(y, sa[i-], sa[i], j)?p-:p++;
if (p >= n)
break;
m = p;
}
for (i=; i<n; i++)
rank[sa[i]] = i;
int k = ;
n --;
for (int i=; i<n; i++)
{
if (k) k --;
int j = sa[rank[i] - ];
while (str[i+k] == str[j+k]) k++;
height[rank[i]] = k;
}
}
bool solve (int x, int n)
{
int ma, mi;
ma = mi = sa[];
for (int i=; i<=n; i++)
{
if (height[i]>=x && i<=n)
{
mi = min(mi, sa[i]);
ma = max(ma, sa[i]);
if (ma - mi >= x) return true;
continue;
} ma = mi = sa[i];
}
return false;
}
int main ()
{
int n;
while (scanf ("%d", &n), n)
{
int s, e;
scanf ("%d", &s);
for (int i=; i<n; i++)
{
scanf ("%d", &e);
r[i-] = s - e + ;
s = e;
}
r[--n] = ; da (r, n, );
int ans = , high = n / , low = , mid;
while (low <= high)
{
mid = (low + high) / ;
if (solve (mid, n))
{
ans = mid;
low = mid + ;
}
else
high = mid - ;
}
printf ("%d\n", ans< ? :ans+);
}
return ;
}