# finding the start and end index for a max sub array

`````` public static void main(String[] args) {

int arr[]= {0,-1,2,-3,5,9,-5,10};

int max_ending_here=0;
int max_so_far=0;
int start =0;
int end=0;

for(int i=0;i< arr.length;i++)
{
max_ending_here=max_ending_here+arr[i];
if(max_ending_here<0)
{
max_ending_here=0;
}

if(max_so_far<max_ending_here){

max_so_far=max_ending_here;

}

}
System.out.println(max_so_far);

}

}
``````

this program generates the max sum of sub array ..in this case its 19,using {5,9,-5,10}.. now i have to find the start and end index of this sub array ..how do i do that ??

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Whats is your expected output for this? Question is not clear – exexzian Jan 6 '13 at 7:56
Go for the kadane algorithm.. maximum sub-array in linear complexity... – KDjava Jan 6 '13 at 8:03

Like This

``````public static void main(String[] args) {

int arr[]= {0,-1,2,-3,5,9,-5,10};

int max_ending_here=0;
int max_so_far=0;
int start =0;
int end=0;

for(int i=0;i< arr.length;i++){
max_ending_here=max_ending_here+arr[i];
if(max_ending_here<0)
{
start=i+1; //Every time it goes negative start from next index
max_ending_here=0;
}
else
end =i; //As long as its positive keep updating the end

if(max_so_far<max_ending_here){
max_so_far=max_ending_here;
}

}
System.out.println(max_so_far);
}
``````

Okay so there was a problem in the above solution as pointed to Steve P. This is another solution which should work for all

``````public static int[] compareSub(int arr[]){
int start=-1;
int end=-1;
int max=0;
if(arr.length>0){
//Get that many array elements and compare all of them.
//Then compare their max to the overall max
start=0;end=0;max=arr[0];
for(int arrSize=1;arrSize<arr.length;arrSize++){
for(int i=0;i<arr.length-arrSize+1;i++){
int potentialMax=sumOfSub(arr,i,i+arrSize);
if(potentialMax>max){
max=potentialMax;
start=i;
end=i+arrSize-1;
}
}
}

}
return new int[]{start,end,max};
}

public static int sumOfSub(int arr[],int start,int end){
int sum=0;
for(int i=start;i<end;i++)
sum+=arr[i];
return sum;
}
``````
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This is not correct, consider `list = [631, -583, -975]` – Steve P. Oct 30 '13 at 1:24
Hey. Fair enough. I added another solution that works for all – cjds Nov 30 '14 at 3:13
@cjds Isn't your second solution's time complexity is O(n2) ? – John Oct 29 '15 at 21:30
Yep. Probably have to revise that to make it better ... – cjds Oct 30 '15 at 13:58

The question is somewhat unclear but I'm guessing a "sub-array" is half the arr object.

A lame way to do this like this

``````public int sum(int[] arr){
int total = 0;
for(int index : arr){
total += index;
}
}

public void foo(){
int arr[] = {0,-1,2,-3,5,9,-5,10};
int subArr1[] = new int[(arr.length/2)];
int subArr2[] = new int[(arr.length/2)];

for(int i = 0; i < arr.length/2; i++){
// Lazy hack, might want to double check this...
subArr1[i] = arr[i];
subArr2[i] = arr[((arr.length -1) -i)];
}

int sumArr1 = sum(subArr1);
int sumArr2 = sum(subArr2);
}
``````

I image this might not work if the arr contains an odd number of elements.

If you want access to a higher level of support convert the primvate arrays to a List object

``````List<Integer> list = Arrays.asList(arr);
``````

Also if you have the time, take a look at the higher order functional called reduce. You will need a library that supports functional programming. Guava or lambdaJ might have a reduce method. I know that apache-commons lacks one, unless you want to hack to together it.

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Here is algorithm for maxsubarray:

``````public class MaxSubArray {

public static void main(String[] args) {
int[] intArr={3, -1, -1, -1, -1, -1, 2, 0, 0, 0 };
//int[] intArr = {-1, 3, -5, 4, 6, -1, 2, -7, 13, -3};
//int[] intArr={-6,-2,-3,-4,-1,-5,-5};
findMaxSubArray(intArr);
}

public static void findMaxSubArray(int[] inputArray){

int maxStartIndex=0;
int maxEndIndex=0;
int maxSum = Integer.MIN_VALUE;

int cumulativeSum= 0;
int maxStartIndexUntilNow=0;

for (int currentIndex = 0; currentIndex < inputArray.length; currentIndex++) {

int eachArrayItem = inputArray[currentIndex];

cumulativeSum+=eachArrayItem;

if(cumulativeSum>maxSum){
maxSum = cumulativeSum;
maxStartIndex=maxStartIndexUntilNow;
maxEndIndex = currentIndex;
}
if (cumulativeSum<0){
maxStartIndexUntilNow=currentIndex+1;
cumulativeSum=0;
}
}

System.out.println("Max sum         : "+maxSum);
System.out.println("Max start index : "+maxStartIndex);
System.out.println("Max end index   : "+maxEndIndex);
}

}
``````
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``````public static void maxSubArray(int []arr){
int sum=0,j=0;
int temp[] = new int[arr.length];

for(int i=0;i<arr.length;i++,j++){
sum  =  sum + arr[i];
if(sum <= 0){
sum =0;
temp[j] = -1;
}else{
temp[j] = i;
}
}
rollback(temp,arr);
}

public static void rollback(int [] temp , int[] arr){
int s =0,start=0 ;
int maxTillNow = 0,count =0;
String str1 = "",str2="";
System.out.println("============");
// find the continuos index
for(int i=0;i<temp.length;i++){

if(temp[i] != -1){
s += arr[temp[i]];
if(s > maxTillNow){
if(count == 0){
str1 = "" + start;
}
count++;
maxTillNow = s;
str2 =  " " + temp[i];
}
}else{
s=0;
count =0;
if(i != temp.length-1)
start = temp[i+1];
}

}
System.out.println("Max sum will be  ==== >> " + maxTillNow);
System.out.print("start from ---> "+str1 + "  end to --- >>  " +str2);
}
``````
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Fixing Carl Saldanha solution:

``````    int max_ending_here = 0;
int max_so_far = 0;
int _start = 0;
int start = 0;
int end = -1;

for(int i=0; i<array.length; i++) {
max_ending_here = max_ending_here + array[i];
if (max_ending_here < 0) {
max_ending_here = 0;
_start = i+1;
}

if (max_ending_here > max_so_far) {
max_so_far = max_ending_here;
start = _start;
end = i;
}
}
``````
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``````    public void MaxSubArray(int[] arr)
{
int MaxSoFar = 0;
int CurrentMax = 0;
int ActualStart=0,TempStart=0,End = 0;

for(int i =0 ; i<arr.Length;i++)
{
CurrentMax += arr[i];
if(CurrentMax<0)
{
CurrentMax = 0;
TempStart = i + 1;
}
if(MaxSoFar<CurrentMax)
{
MaxSoFar = CurrentMax;
ActualStart = TempStart;
End = i;
}
}
Console.WriteLine(ActualStart.ToString()+End.ToString());
}
``````
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The only thing I have to add (to several solutions posted here) is to cover the case that all the integers are negative, in which case the max sub array will be just the max element. Pretty easy to do that.. just have to track max element and index of the index of the max element as you iterate through it. If the max element is negative, return it's index instead.

There is also the case of overflow to possibly handle. I've seen algorithm tests that take than into account.. IE, suppose MAXINT was one of the elements and you tried to add to it. I believe some of the Codility (coding interview screeners) tests take that into account.

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Here is a solution in python - Kadane's algorithm extended to print the start/end indexes

``````def max_subarray(array):
max_so_far = max_ending_here = array[0]
start_index = 0
end_index = 0
for i in range(1, len(array) -1):
temp_start_index = temp_end_index = None
if array[i] > (max_ending_here + array[i]):
temp_start_index = temp_end_index = i
max_ending_here = array[i]
else:
temp_end_index = i
max_ending_here = max_ending_here + array[i]
if max_so_far < max_ending_here:
max_so_far = max_ending_here
if temp_start_index != None:
start_index = temp_start_index
end_index = i
print max_so_far, start_index, end_index

if __name__ == "__main__":
array = [-2, 1, -3, 4, -1, 2, 1, 8, -5, 4]
max_subarray(array)
``````
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