最长上升子序列问题 代码(C)
本文地址: http://blog.csdn.net/caroline_wendy
题目: 有一个长为n的数列a. 请求出这个序列中最长上升子序列的长度. 最长上升子序列的数字之间能够有间隔.
即最长上升子序列(LIS, Longest Increasing Subsequence), 比如: n=5, a={4,2,3,1,5}, result=3(2,3,5).
使用动态规划求解(DP).
方法1: 依次求出每一个数字之前的最长上升子序列, 时间复杂度O(n^2).
方法2: 求取针对最末位的元素的最长子序列, 使用较小的元素更新数组, 应用二分搜索查找元素, 时间复杂度(nlogn).
代码:
/*
* main.cpp
*
* Created on: 2014.7.20
* Author: Spike
*/
/*eclipse cdt, gcc 4.8.1*/
#include <stdio.h>
/*
* main.cpp
*
* Created on: 2014.7.20
* Author: spike
*/
/*eclipse cdt, gcc 4.8.1*/
#include <stdio.h>
#include <memory.h>
#include <limits.h>
#include <algorithm>
using namespace std;
class Program {
static const int MAX_N = 100;
const int INF = INT_MAX>>2;
int n = 5;
int a[MAX_N] = {4, 2, 3, 1, 5};
int dp[MAX_N];
public:
void solve() {
int res = 0;
for (int i=0; i<n; ++i) {
dp[i] = 1;
for (int j=0; j<i; ++j) {
if (a[j]<a[i]){
dp[i] = max(dp[i], dp[j]+1);
}
}
res = max(res, dp[i]);
}
printf("result = %d
", res);
}
void solve2() {
fill(dp, dp+n, INF);
for (int i=0; i<n; i++) {
*lower_bound(dp, dp+n, a[i]) = a[i];
}
printf("result = %d
", lower_bound(dp, dp+n, INF)-dp);
}
};
int main(void)
{
Program iP;
iP.solve2();
return 0;
}
输出:
result = 3
