# Find the length of the longest increasing subsequence using only one auxiliary recursion function

I need to find the length of the longest monotonically increasing subsequence using only a single recursion function. For example given an `arr={45 1 21 3 33 6 53 9 18}` it need to give back 5. I have started to write the code but i'm stuck, and i don't know how to find out which of the calls gives the maximum length.

The function `longestSet` is my auxiliary function i can use any variables i want but it have to be called from the function `max_set`.

``````void question3(int question)
{
int *arr, size;
printf("enter the array size\n");
scanf("%d", &size);
arr=(int*)malloc(size*sizeof(int));
fillArr(arr, size-1);
max_set(arr, size);
free(arr);
}

void max_set(int arr[], int size)
{
int i=0, finelmax=0, count=0,longrising;
longrising=longestSet(arr,size,i,finelmax,count);
printf("the length of the longest risind set is: %d", longrising);
}

int longestSet(int arr[], int size, int i, int finelmax, int count)
{
if(i==size)
return count;

if(arr[i]>=finelmax)
{
finelmax=arr[i];
return longestSet(arr,size,i+1,finelmax,count+1);
}

return longestSet(arr,size,i+1,finelmax,count);
}
``````
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Welcome to SO. The term "set" is very misleading, since a set is by definition unordered and can't be rising. "Sequence" is more appropriate, I'll edit it in. Additionally, is this homework? It is customary to mark homework with the `homework` tag. – thiton Dec 28 '11 at 16:04
I don't see any C++ code in here, so I'll mark this as a C question. If both languages are fine with you, add the C++ tag again, next to the C tag. – Paul Manta Dec 28 '11 at 16:15
No, don't add both the C and C++ tags. They're very different languages, and they imply very different answers. Pick one and stick with it. – Cody Gray Dec 28 '11 at 16:17
This problem can be reduced to finding the longest sequence of '1's in a binary string. Perhaps that might help?? - or maybe not - the example doesn't match the problem description as I understand it. – paperjam Dec 28 '11 at 16:24

Something like this:

``````int longestSet(int arr[], int size, int i, int finelmax, int count)
{
if(i==size) return count;

int length1 = longestSet(arr, size, i + 1, finelmax, count);
if(arr[i] > finelmax)
{
int length2 = longestSet(arr, size, i + 1, arr[i], count + 1);
if(length2 > length1) length1 = length2;
}

return length1;
}
``````

What this basically does is at each point compare if it would be better to include the current number or skip it. Also will be pretty slow - you can for example add memoization to it to improve, but I'm guessing that's not part of the homework?

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First thank you! It's not past of the homework but I'd like to understand what do you mean memoization? Limit the size of the array? – Lilach Banit Dec 28 '11 at 23:05
Check out en.wikipedia.org/wiki/Memoization - basically it means saving the result of a function somewhere and then using that result instead of computing again if the function is called with the same arguments. – Paweł Obrok Dec 29 '11 at 9:40

I'm giving here the full code with a single recursion function you asked. Unfortunately it's in java but your purpose would be solved as the function used for recursion is almost same.

``````import java.util.StringTokenizer;
import java.io.IOException;

class longestSubSequence{
public static void main (String [] args)throws IOException{
new longestSubSequence().run();
}

int max = -1;
int index = 1;
int [] array;
private void run() throws IOException{
array = new int [50];
// Input your array
StringTokenizer st = new StringTokenizer (br.readLine());
array[0] = -1;
while (st.hasMoreTokens()){
array[index++] = Integer.parseInt(st.nextToken());
}
index--;
dfs (0, 0);
System.out.println(max);//      Prints the maximum length
}

private void dfs (int curr, int length){
if (length > max )max = length;
if (curr >= index)
return ;
for (int I=curr+1;I <= index; I++){
if (array[I] >= array[curr]){
dfs (I, length+1);
}
}
}
}
``````
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