Farmer John has noticed that the quality of milk given by his cows varies from day to day. On further investigation, he discovered that although he can't predict the quality of milk from one day to the next, there are some regular patterns in the daily milk quality.
To perform a rigorous study, he has invented a complex classification scheme by which each milk sample is recorded as an integer between 0 and 1,000,000 inclusive, and has recorded data from a single cow over N (1 ≤ N ≤ 20,000) days. He wishes to find the longest pattern of samples which repeats identically at least K (2 ≤ K ≤ N) times. This may include overlapping patterns -- 1 2 3 2 3 2 3 1 repeats 2 3 2 3 twice, for example.
Help Farmer John by finding the longest repeating subsequence in the sequence of samples. It is guaranteed that at least one subsequence is repeated at least K times.
Input
Lines 2.. N+1: N integers, one per line, the quality of the milk on day i appears on the ith line.
Output
Sample Input
8 2 1 2 3 2 3 2 3 1
Sample Output
4
题目大意: 给出一个数列,求出数列中最长连续子序列,并且满足该子序列在数列中出现超过k次。
思路:二分枚举长度L,然后记录从每个位置开始长度为L的字符串的哈希值,最后去遍历这些哈希值看看想等的数量是否大于等于k
1 #include <stdio.h> 2 #include <algorithm> 3 #include <iostream> 4 #include <stdlib.h> 5 #include <string> 6 #include <string.h> 7 #include <math.h> 8 #include <vector> 9 #include <queue> 10 #include <stack> 11 #include <map> 12 #include <set> 13 14 15 #define INF 0x3f3f3f3f 16 #define LL long long 17 18 typedef unsigned long long ull; 19 const int maxn = 1e5+10; 20 21 int a[maxn]; 22 int s[maxn]; 23 ull base = 131; 24 ull mod = 1e9+7; 25 ull p[maxn]; 26 ull h1[maxn],h2[maxn]; 27 ull q[maxn]; 28 int n,k; 29 30 ull get_hash(ull h[],int l,int r){ 31 return (h[r] - h[l-1]*p[r-l+1]); 32 } 33 34 bool check(int len) { 35 int cnt = 0; 36 for (int i=1;i+len-1<=n;i++) { 37 q[cnt++] = get_hash(h1,i,i+len-1); 38 } 39 std::sort(q,q+cnt); 40 for (int i=0;i<cnt;i++) { 41 int ans = 0; 42 int j; 43 for (j=i;j<cnt;j++) { 44 if (q[i] == q[j]) 45 ans++; 46 else 47 break; 48 } 49 i = j-1; //可以稍微剪一下 50 if (ans>=k) 51 return true; 52 } 53 return false; 54 } 55 56 57 58 59 int main(){ 60 std::cin >> n >> k; 61 p[0] = 1; 62 for (int i=1;i<maxn;i++) { 63 p[i] = p[i-1] * base; 64 } 65 for (int i=1;i<=n;i++) { 66 std::cin >> s[i]; 67 } 68 for (int i=1;i<=n;i++) { 69 h1[i] = h1[i-1] * base + s[i]; 70 } 71 int l = 0,r = n; 72 int ans = 0; 73 while (l <= r) { 74 int mid = (l + r) >> 1; 75 if (check(mid)) { 76 ans = mid; 77 l = mid + 1; 78 } 79 else 80 r = mid - 1; 81 } 82 printf("%d ",ans); 83 return 0; 84 }