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longestIncreasingSubsequence.cpp
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longestIncreasingSubsequence.cpp
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// Source : https://leetcode.com/problems/longest-increasing-subsequence/
// Author : Calinescu Valentin, Hao Chen
// Date : 2015-11-06
/***************************************************************************************
*
* Given an unsorted array of integers, find the length of longest increasing
* subsequence.
*
* For example,
* Given [10, 9, 2, 5, 3, 7, 101, 18],
* The longest increasing subsequence is [2, 3, 7, 101], therefore the length is 4.
* Note that there may be more than one LIS combination, it is only necessary for yo
* to return the length.
*
* Your algorithm should run in O(n2) complexity.
*
* Follow up: Could you improve it to O(n log n) time complexity?
*
* Credits:
* Special thanks to @pbrother for adding this problem and creating all test cases.
*
***************************************************************************************/
// O(n^2) - dynamic programming
class Solution {
public:
int lengthOfLIS(vector<int>& nums) {
int len = nums.size();
int maxLen = 0;
vector<int> dp(len, 1);
for (int i=0; i<len; i++) {
for(int j=0; j<i; j++) {
if ( nums[j] < nums[i] ) {
dp[i] = max(dp[i], dp[j] + 1);
}
}
maxLen = max(maxLen, dp[i]);
}
return maxLen;
}
};
class Solution {
public:
/*
* Solution 1 - O(N^2)
* =========
*
* LIS - longest increasing subsequence
*
* We iterate through the elements to find the LIS that ends with the current element.
* To do that we need to look at all of the previous elements and find one smaller than
* the current one so that we can add the current one to the sequence terminated in the
* smaller one. The length of the LIS ending in the current element is the length of the
* LIS ending in the smaller one + 1. To find the maximum current LIS we need to use the
* maximum previous LIS that satisfies the conditions.
*
*/
vector <int> longest_LIS;
int lengthOfLIS(vector<int>& nums) {
int answer = 0;
if(nums.size())
{
longest_LIS.push_back(1);
answer = 1;
for(int i = 1; i < nums.size(); i++)
{
int maximum = 1;
for(int j = 0; j < longest_LIS.size(); j++)
if(nums[i] > nums[j])
maximum = max(maximum, longest_LIS[j] + 1);
longest_LIS.push_back(maximum);
answer = max(maximum, answer);
}
}
return answer;
}
/*
* Solution 2 - O(N * logN)
* =========
*
* LIS - longest increasing subsequence
*
* We iterate through the elements to find the position of the current element in the
* current LIS. After we find its position we change the LIS replacing the next biggest
* element with the current one or increase the size of the sequence if the current element
* is bigger than the biggest one. This way we keep the LIS with the smallest possible
* elements. By keeping any other LIS we can encounter an element that could have been added
* to the LIS with the smallest elements, but can't be added to the current one, therefore
* missing the solution.
*
*/
vector <int> longest_subsequence; // the LIS
vector <int> nums;
int binary_search(int number)
{
int start = 0, end = longest_subsequence.size() - 1;
if(start == end)
{
if(number > longest_subsequence[start])
return start + 1;
else
return start;
}
while(start < end)
{
if(start == end - 1)
{
if(number > longest_subsequence[start] && number <= longest_subsequence[end])
return end;
else if(number <= longest_subsequence[start])
return start;
else
return end + 1;
}
int middle = (start + end + 1) / 2;
if(longest_subsequence[middle] < number)
start = middle;
else
end = middle;
}
}
int lengthOfLIS(vector<int>& nums) {
int answer = 0;
if(nums.size())
{
answer = 1;
longest_subsequence.push_back(nums[0]);
for(int i = 1; i < nums.size(); i++)
{
int position = binary_search(nums[i]);
if(position == longest_subsequence.size())
longest_subsequence.push_back(nums[i]);
else
longest_subsequence[position] = nums[i];
answer = max(answer, position + 1);
}
}
return answer;
}
};