# Absurd condition in Longest Increasing Subquence

``````    /* A Naive recursive implementation of LIS problem */
#include<stdio.h>
#include<stdlib.h>

/* To make use of recursive calls, this function must return two things:
1) Length of LIS ending with element arr[n-1]. We use max_ending_here
for this purpose
2) Overall maximum as the LIS may end with an element before arr[n-1]
max_ref is used this purpose.
The value of LIS of full array of size n is stored in *max_ref which is our final result
*/
int _lis( int arr[], int n, int *max_ref)
{
/* Base case */
if(n == 1)
return 1;

int res, max_ending_here = 1; // length of LIS ending with arr[n-1]

/* Recursively get all LIS ending with arr[0], arr[1] ... ar[n-2]. If
arr[i-1] is smaller than arr[n-1], and max ending with arr[n-1] needs
to be updated, then update it */
for(int i = 1; i < n; i++)
{
res = _lis(arr, i, max_ref);
if (arr[i-1] < arr[n-1] && res + 1 > max_ending_here)
max_ending_here = res + 1;
}

// Compare max_ending_here with the overall max. And update the
// overall max if needed
if (*max_ref < max_ending_here)
*max_ref = max_ending_here;

// Return length of LIS ending with arr[n-1]
return max_ending_here;
}

// The wrapper function for _lis()
int lis(int arr[], int n)
{
// The max variable holds the result
int max = 1;

// The function _lis() stores its result in max
_lis( arr, n, &max );

// returns max
return max;
}

/* Driver program to test above function */
int main()
{
int arr[] = { 10, 22, 9, 33, 21, 50, 41, 60 };
int n = sizeof(arr)/sizeof(arr[0]);
printf("Length of LIS is %d\n",  lis( arr, n ));
getchar();
return 0;
``````

Let arr[0..n-1] be the input array and L(i) be the length of the LIS till index i such that arr[i] is part of LIS and arr[i] is the last element in LIS, then L(i) can be recursively written as. L(i) = { 1 + Max ( L(j) ) } where j < i and arr[j] < arr[i] and if there is no such j then L(i) = 1.

In the above implementation , i am not able to understand the use/importance of the condition `if (arr[i-1] < arr[n-1] && res + 1 > max_ending_here)`. It's doesn't even looks like the recursive formula , then why is it needed.When `L(i)/*is just*/ = { 1 + Max ( L(j) ) } where j < i and arr[j] < arr[i] and if there is no such j then L(i) = 1` thenwhy do we need to compare `arr[i-1] < arr[n-1]`. Is it possible to come with a recursive solution which is similar to the recursive formula?

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LIS: Here's a simple solution following the definition of LIS. Assuming A is the input array of numbers, N is the size of A.

``````int L[51];
int res=-1;
for(int i=0;i<N;i++)
{
L[i]=1;
for(int j=0;j<i;j++)
if(A[j]<A[i])
{
L[i]=max(L[i],L[j]+1);
}
res=max(res,L[i]);
}
return res;
``````

Time Complexity: O(N2).

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