# Find repeating in O(n) and constant space [duplicate]

I saw an interesting Question on one forum.

you have 100 elements from 1 to 100 but byy mistake one of those number overlapped another by repeating itself. E.g. 1,99,3,...,99,100 Array is not in sorted format , how to find the repeating number ?

I know Hash can do it O(n) time and O(n) space, I need O(1) space.

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Why did you accept incorrect answer? (not O(1) space) –  TT_ Jan 11 at 18:16

## marked as duplicate by PengOne, foobar, templatetypedef, Cody Gray, Shawn ChinJan 31 '12 at 10:11

We can do it in O(n) and constant space:

1. For every element, calculate `index = Math.abs(a[i]) - 1`
2. Check the value at `index`
• If it is positive, multiply by -1, i.e., make it negative.
• if it is negative, return (`index+1`) as answer, as it means we have seen this index before.

""

``````static int findDup(int[] a){
for(int i=0;i<a.length;i++){
int index = Math.abs(a[i]) - 1;
if(a[index] < 0)
return index+1;
else
a[index] = -1 * a[index];
}
return -1;
}
``````
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You're storing a piece of information for (potentially) every element in your input. This is not constant space. –  Nick Barnes Jan 31 '12 at 0:19
@Manan You're still using a linear amount of space to construct your solution. If your input set is immutable, or not randomly accessible, or doesn't support signed integers, then you'd need to create this array yourself. –  Nick Barnes Jan 31 '12 at 0:33
@Manan None of these constraints (modifiable signed input with constant-time random access) was explicitly given in the question, so it's a bit of a stretch to assume them. But in any case, this still doesn't qualify as a constant-space algorithm. It's not a question of how many bytes you need to malloc(); it's a question of how many pieces of information you need to record. –  Nick Barnes Jan 31 '12 at 0:49
@Manan But you're still storing something. Your algorithm is basically a bucket sort. Your buckets in this case are the vacant sign bits in your input array. But it's still a linear-space algorithm. –  Nick Barnes Jan 31 '12 at 1:09
@Manan The line `a[index] = -1 * a[index];` overwrites the input. This is why people are stating that this solution is not constant space. –  PengOne Jan 31 '12 at 1:10

Calculate two sums: sum and square sum.

``````sum = 1+99+3...+100

sq_sum = 1^2+99^2+3^2+...+100^2
``````

Assume y replaced x in the sequence.

``````sum = n(n+1)/2 -y+x.
sq_sum = n(n+1)(2n+1)/6 -x^2 +y^2
``````

Now, solve for x & y.

Constant space and O(n) time.

## How to solve for x and y

From equation:

``````x = sum - n(n+1)/2 +y
``````

Substitute this in the second equation:

``````sq_sum = n(n+1)(2n+1)/6 -(sum - n(n+1)/2 +y)^2 +y^2
``````

Note that y^2 cancels and you are left with a linear equation with only one unknown:y. Solve it!

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This answer has 2 down votes and no comments. Please explain what is incorrect here so that the OP can rebut or revise and others understand the (potential) problem. –  PengOne Jan 31 '12 at 0:52
How do you solve this for x&y? –  WisaF Jan 31 '12 at 1:15
@WisaF See updated solution –  ElKamina Jan 31 '12 at 1:23
is square sum really needed, if the array length is 101 and there's 100 unique values, then you sum those 100 unique values and get 5050, the suppose the sum comes back as being 5149 you instantly know that 99 was duplicated, this doesn't work when there are more than one duplicates but the question only mentioned one value repeated once. –  Seph Jan 31 '12 at 9:03
@Seph Array length is 100. One number is repeated, one number is omitted. Hence two unknowns, requiring two equations. –  Nick Barnes Jan 31 '12 at 10:21
show 1 more comment

New approach. Let `m` be the missing number and `r` be the repeated number. Passing through the array once, let `X` be the result of `XOR`ing the entries of the array along with the indices `1` to `n`. Then `X = m XOR r`. In particular, it isn't `0`. Let `b` be any nonzero bit of `X` (you only need to choose one, and one exists since `X` is not `0`). Passing through the array, let `Y` be the result of `XOR`ing the entries of the array and the indices `1` to `n` where the bit `b` is `0` and let `Z` be the result of `XOR`ing the entries of the array and the indices `1` to `n` where the bit `b` is `1`. Then `Y` and `Z` hold `m` and `r`, so all that remains is to make a final pass to see which is in the array.

Total space: 4 (or 3 if you reuse `X` for `b`)

Total time: 7 passes (or 3 if you do indices at the same time as the array and compute `Y` and `Z` at the same time.

Hence `O(1)` space and `O(n)` time.

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Are you sure? In the first step slow is n+1. So array[slow] returns error or garbage, no? –  ElKamina Jan 31 '12 at 1:00
I still think it wouldn't work. Consider cases where there are multiple cycles. Or consider a case where array[n]=n. –  ElKamina Jan 31 '12 at 1:06
So you need one extra passes for each non-zero bit of X right? In that case your solution O(nlogn) in time. I am not very sure of that fact, but please let me know. –  ElKamina Jan 31 '12 at 1:42
@ElKamina No, you only make one pass for your favorite nonzero bit. You do not have to do this for every nonzero bit. It works for any nonzero bit. –  PengOne Jan 31 '12 at 1:43
Seems very novel idea! –  ElKamina Jan 31 '12 at 4:23