8

For one of the questions i was asked to solve, I found the max value of an array using a for loop, so i tried to find it using recursion and this is what I came up with:

public static int findMax(int[] a, int head, int last) {

    int max = 0;
    if (head == last) {
        return a[head];
    } else if (a[head] < a[last]) {
        return findMax(a, head + 1, last);
    } else {
        return a[head];
    }
}

So it works fine and gets the max value, but my question is : is it ok to have for the base case return a[head] and for the case when the value at the head is > the value at last?

  • Yes I did, and it works – Scarl Oct 25 '13 at 12:56
  • 1
    its not your fault, but it is totally idiodic to find the max value in an array via recursion. This is a misuse of recursion technic. – AlexWien Oct 25 '13 at 13:09
  • I basically know how to get the max value using a for loop, so i wanted to try to write out the code using recursion – Scarl Oct 25 '13 at 13:19
  • This should fail for the array {2,42,1} if head=0 and last=2, the method would return 2 without recursing. – Ingo Oct 25 '13 at 13:49
  • @Ingo it actually returns 42 as a max value..EDIT: nevermind you are right! – Scarl Oct 25 '13 at 16:44

12 Answers 12

14

You could just as easily do it with only one counter, just the index of the value you want to compare this time:

public static int findMax(int[] a, int index) {
    if (index > 0) {
        return Math.max(a[index], findMax(a, index-1))
    } else {
        return a[0];
    }
}

This much better shows what is going on, and uses the default "recursion" layout, e.g. with a common base step. Initial call is by doing findMax(a, a.length-1).

  • if(index) doesn't compile ;) – Thomas Jungblut Oct 25 '13 at 12:56
  • Actually, I worked it out with 2 counters in order to keep track of the index..like the head counter will be the one moving towards the end of the array. In your answer, i don't get why you used the Math.max. – Scarl Oct 25 '13 at 12:58
  • @ThomasJungblut Thanks. I don't usually program Java, fortunately :) – Joost Oct 25 '13 at 12:59
  • Math.max does what your if (a[head] < a[last]) does, essentially. This is basically Divide and Conquer, where you only handle the current index and the result of the rest (the recursive call) and merge them together for the required answer. In this case you want the maximum of them, so you merge with Math.max. – Joost Oct 25 '13 at 13:03
7

It's actually much simpler than that. The base case is if you've reached the end of the array (the 'else' part of the ternary control block below). Otherwise you return the max of the current and the recursive call.

public static int findMax(int[] a) {
    return findMax(a, 0);
}
private static int findMax(int[] a, int i) {
    return i < a.length
           ? Math.max(a[i], findMax(a, i + 1))
           : Integer.MIN_VALUE;
}

At each element, you return the larger of the current element, and all of the elements with a greater index. Integer.MIN_VALUE will be returned only on empty arrays. This runs in linear time.

3

I would solve this by dividing the array in to the half on each recursive call.

 findMax(int[] data, int a, int b)

where a and b are array indices.

The stop condition is when b - a <= 1, then they are neighbours and the max is max(a,b);

The initial call:

 findMax(int[] data, int 0, data.length -1);

This reduces the maximum recursion depth from N to log2(N).
But the search effort still stays O(N).

This would result in

int findMax(int[] data, int a, int b) {
   if (b - a <= 1) {
     return Math.max(data[a], data[b]);
   } else {
     int mid = (a+b) /2; // this can overflow for values near Integer.Max: can be solved by a + (b-a) / 2; 
     int leftMax =  findMax(a, mid);
     int rightMax = findMax(mid +1, b);
     return Math.max(leftMax, rightMax);
   }
}
  • The only optimisation there is that you're decreasing the stack overhead, it's still the same (O(n)) complexity. – azz Oct 25 '13 at 13:20
  • Indeed, @DerFlatulator. Because here both sides of the "tree" are visited, all n elements are visited, for O(n). Its resembles of a binary search is misleading, because for binary search only one side of the tree is visited, to reach the deepest element in O(log n) steps, for a balanced tree. – Joost Oct 25 '13 at 13:28
  • Yes this is the only optimisation, but it increaes the possible array size; But its still a stupid question; they should learn a recursive binary search instead. – AlexWien Oct 25 '13 at 13:28
  • @Joost Updated to incorporate your comments. – AlexWien Oct 25 '13 at 13:31
  • 1
    It doesn't really make sense to search a regular array with recursion, anyway. So attempting to optimise it when you could just switch to an iterative approach seems futile. – azz Oct 25 '13 at 13:32
1

What about this one ?

public static int maxElement(int[] a, int index, int max) {
    int largest = max;
    while (index < a.length-1) {
        //If current is the first element then override largest
        if (index == 0) {
            largest = a[0];
        }
        if (largest < a[index+1]) {
            largest = a[index+1];
            System.out.println("New Largest : " + largest); //Just to track the change in largest value
        }
        maxElement(a,index+1,largest);
    }
    return largest;
}
1

I know its an old Thread, but maybe this helps!

public static int max(int[] a, int n) {
        if(n < 0) {
            return Integer.MIN_VALUE;
        }
        return Math.max(a[n-1], max(a, n - 2));

    }
1

I came across this thread and it helped me a lot. Attached is my complete code in both recursion and divide&conquer cases. The run time for divide&conquer is slightly better than recursion.

//use divide and conquer.
public int findMaxDivideConquer(int[] arr){
    return findMaxDivideConquerHelper(arr, 0, arr.length-1);
}
private int findMaxDivideConquerHelper(int[] arr, int start, int end){
    //base case
    if(end - start  <=  1) return Math.max(arr[start], arr[end]);
    //divide
    int mid = start + ( end - start )/2;
    int leftMax =findMaxDivideConquerHelper(arr, start, mid);
    int rightMax =findMaxDivideConquerHelper(arr, mid+1, end);
    //conquer
    return Math.max( leftMax, rightMax );
}

// use recursion. return the max of the current and recursive call
public int findMaxRec(int[] arr){
    return findMaxRec(arr, 0);
}
private int findMaxRec(int[] arr, int i){
    if (i == arr.length) {
        return Integer.MIN_VALUE;
    }
    return Math.max(arr[i], findMaxRec(arr, i+1));
}
1
class Test
{
    int high;
    int arr[];
    int n;
    Test()
    {
        n=5;
        arr = new int[n];
        arr[0] = 10;
        arr[1] = 20;
        arr[2] = 30;
        arr[3] = 40;
        arr[4] = 50;
        high = arr[0];
    }
    public static void main(String[] args)
    {
       Test t = new Test();
       t.findHigh(0);
       t.printHigh();
    }
    public void printHigh()
    {
        System.out.println("highest = "+high);
    }
    public void findHigh(int i)
    {
        if(i > n-1)
        {
            return;
        }
        if(arr[i] > high)
        {
            high = arr[i];
        }
        findHigh(i+1);
        return;
    }
}
0

You can do it recursively as follows.

Recurrent relation it something like this.

   f(a,n)   = a[n]   if n == size
            = f(a,n+1) if n != size

Implementation is as follows.

   private static int getMaxRecursive(int[] arr,int pos) {
         if(pos == (arr.length-1)) {
                return arr[pos];
         } else {           
                return Math.max(arr[pos], getMaxRecursive(arr, pos+1));
         }
   }

and call will look like this

      int maxElement = getMaxRecursive(arr,0);
0

its not okay! your code will not find the maximum element in the array, it will only return the element that has a higher value than the elements next to it, to solve this problem,the maximum value element in the range can be passed as argument for the recursive method.

    private static int findMax(int[] a, int head, int last,int max) {
    if(last == head) {
        return max;
    }
    else if (a[head] > a[last]) {
            max = a[head];
            return findMax(a, head, last - 1, max);
        } else {
            max = a[last];
            return findMax(a, head + 1, last, max);
        }
}
0

Optimized solution

public class Test1 {
    public static int findMax(int[] a, int head, int last) {

        int max = 0, max1 = 0;

        if (head == last) {
            return a[head];

        } else if (a[head] < a[last]) {
            max = findMax(a, head + 1, last);
        } else
            max = findMax(a, head, last - 1);

        if (max >= max1) {
            max1 = max;
        }
        return max1;


    }

    public static void main(String[] args) {
        int arr[] = {1001, 0, 2, 1002, 2500, 3, 1000, 7, 5, 100};
        int i = findMax(arr, 0, 9);
        System.out.println(i);
    }
}
0

Thanks @Robert Columbia for the suggestion!

Update: This following function is going to recursively start from index 0 and it will keep adding to this index value till it's equal to the Length of the array, if it's more we should stop and return 0. Once we're doing that, we need to get the max of every two items in the array so, for example:

A = [1 , 2 , 3 ];

A[0] ( 1 ) vs A[1] ( 2 ) = 2 
A[1] ( 2 ) vs A[2] ( 3 ) = 3
Max(2,3) = 3 ( The answer )  





public int GetMax(int [] A, int index)  {

     index += 1;
     if (index >= A.Length) return 0;
     return Math.Max(A[index], GetMax(A, index + 1));

 }
  • 2
    While this code may answer the question, it is better to explain how to solve the problem and provide the code for reference. Code-only answers tend to be of low utility and can be confusing. – Columbia says Reinstate Monica May 13 '18 at 1:02
-1
int maximum = getMaxValue ( arr[arr.length - 1 ], arr, arr.length - 1 );

public static int getMaxValue ( int max, int arr[], int index )
{
    if ( index < 0 )
        return max;
    if ( max < arr[index] )
        max = arr[index];
    return getMaxValue ( max, arr, index - 1 ); 
}

I felt that using a tracker for current maximum value would be good.

  • At first glance this will only work with arrays of length >= 2. – azz Oct 25 '13 at 13:22
  • why is there a length-2 in this proposal? – Scarl Oct 25 '13 at 13:25

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