# Getting range of max product subarray using Kadanes algorithm

Applying Kadane algorithm to get max product subarray seems tricky. While I am able to get the max product, I am not really getting the correct range of the max product subarray.

http://www.geeksforgeeks.org/maximum-product-subarray/ explains the way to get the max product but I dont get how we can get the range of the subarray.

Can someone help me understand the range issue? This is a standard interview question and I want to make sure I understand the logic for the product case instead of just saying that the max sum subarray can be modified to answer max product subarray case.

thanks!!

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it is not kadane's algorithm rather is similar to that. –  Trying Nov 14 '13 at 0:41

The link you have provided seems to assume that all the elements are positive. However in my opinion this is not a safe assumption. I have return code to get sub array for maximum product. I have used the same logic used in Kadane's algorithm. Code seems to work for me for all kinds of input. Please let me know if there are issues.

``````public static int[] getMaxSubArray(int []arr){

int maxEndingHere = arr[0], maxSoFar = arr[0], startIndex =0, start =0,end=0;

for(int i=1;i<arr.length;i++){

if(maxEndingHere<0){
maxEndingHere = arr[i];
startIndex = i;
}else{
maxEndingHere *= arr[i];
}
if(maxEndingHere>=maxSoFar){
maxSoFar = maxEndingHere;
start = startIndex;
end = i;
}
}
if(start<=end)
return Arrays.copyOfRange(arr, start, end+1);

return null;
}
``````
1. Sample input = `{6, 3, -10, 0, 2}` Output = `{6,3}`
2. Sample input = `{-2,1,-3,4,-1,2,1,-5,4}` Output = `{4}`
3. Sample input = `{-1,-2,-9,-6}` Output = `{-1}`
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Sample input = {-2,1,-3,4,-1,2,1,-5,4} Output = {-2,1,-3,4,-1,2,1,-5,4} –  Blacklabel Feb 4 at 23:36
``````def max_subarray(A):
max_ending_here = max_so_far = 0
max_start = start = 0
max_end = end = 0

# the range is [max_start, max_end)

for i, x in enumerate(A):
if max_ending_here + x > 0:
max_ending_here = max_ending_here + x
end = i+1
else:
max_ending_here = 0
start = end = i

if max_ending_here > max_so_far:
max_so_far = max_ending_here
max_start = start
max_end = end

return (max_start, max_end)
``````
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It has basically three cases:

1. current number is +ve
2. current number is -ve
3. current number is 0

You need to have two variable:

• `min` which hold minimum value till now

• `max` which holds the maximum value till now.

Now for `case 3` `min` and `max` will be reset to 1.

For `case 1`: than `max` will be `max * a[i]` and `min` will be minimum of `min*a[i]` and `1.`

For case 1: `max` will be maximum of `a[i] * min` and `1`, but the `min` value will be `max * a[i].`

Below is the code:

``````private static int getMaxProduct(int[] a){
int minCurrent = 1, maxCurrent = 1, max = Integer.MIN_VALUE;
for (int current : a) {
if (current > 0) {
maxCurrent = maxCurrent * current;
minCurrent = Math.min(minCurrent * current, 1);
} else if (current == 0) {
maxCurrent = 1;
minCurrent = 1;
} else {
int x = maxCurrent;
maxCurrent = Math.max(minCurrent * current, 1);
minCurrent = x * current;
}
if (max < maxCurrent) {
max = maxCurrent;
}
}
//System.out.println(minCurrent);
return max;
}
``````
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