The purpose of this program is to find the kth smallest element in an array without sorting the array using a recursive and nonrecursive decrease and conquer type method.

I was hoping someone could look over my code and try to help me with my array out of bounds error(s).

The method that is throwing these errors is the recursive selection the non recursive selection works fine.

My driver is also attached and everything should compile if you want to test my code.

```
public class KthSmallest
{
private int counter;
private int term;
private int[] A;
int SelectionNonRecursive(int A[], int kthSmallest, int sizeOfA)
{
this.A = A;
if(kthSmallest == 1 || kthSmallest == sizeOfA)
{
return (LinearSearch(kthSmallest, sizeOfA));
}
else
{
for(int i = 0; i<sizeOfA; i++)
{
counter = 0;
for(int j = 0; j<sizeOfA; j++)
{
if(A[i] < A[j])
{
counter++;
}
}
if((sizeOfA - counter) == kthSmallest)
{
return A[i];
}
}
}
return 0;
}
int SelectionRecursive(int A[], int kthSmallest, int sizeOfA)
{
this.A = A;
return Selection_R(0, sizeOfA - 1, kthSmallest);
}
int Selection_R(int l, int r, int kthSmallest)
{
if(l<r)
{
if(kthSmallest == 1 || kthSmallest == A.length)
{
return (LinearSearch(kthSmallest, A.length));
}
else
{
int s = LomutoPartition(l, r);
if(s == kthSmallest - 1)
{
return A[s];
}
else if(s > (A[0] + kthSmallest - 1))
{
Selection_R(l, s-1, kthSmallest);
}
else
{
Selection_R(s+1, r, kthSmallest);
}
}
}
return 0;
}
int LomutoPartition(int l, int r)
{
int pivot = A[l];
int s = l;
for(int i = l+1; i<r; i++)
{
if(A[i] < pivot)
{
s += 1;
swap(A[s], A[i]);
}
}
swap(A[l], A[s]);
return s;
}
public void swap(int i, int j)
{
int holder = A[i];
A[i] = A[j];
A[j] = holder;
}
int LinearSearch(int kthSmallest, int sizeOfA)
{
term = A[0];
for(int i=1; i<sizeOfA; i++)
{
if(kthSmallest == 1)
{
if(term > A[i])
{
term = A[i];
}
}
else
{
if(term < A[i])
{
term = A[i];
}
}
}
return term;
}
}
public class KthDriver
{
public static void main(String[] args)
{
KthSmallest k1 = new KthSmallest();
int[] array = {7,1,5,9,3};
System.out.print(k1.SelectionRecursive(array, 3, array.length));
}
}
```