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It is an interview question:

Given an input file with four billion integers, provide an algorithm to generate an integer which is not contained in the file. Assume you have 1 GiB memory. Follow up with what you would do if you have only 10 MiB of memory.

My analysis:

The size of the file is 4 * 109 * 4 bytes = 16 GiB.

We can do external sorting, thus we get to know the range of the integers. My question is what is the best way to detect the missing integer in the sorted big integer sets?

My understanding(after reading all answers):

Assuming we are talking about 32-bit integers. There are 2^32 = 4*109 distinct integers.

Case 1: we have 1 GiB = 1 * 109 bytes * 8 bits/byte = 8 billion bits memory. Solution: if we use one bit representing one distinct integer, it is enough. we don't need sort. Implementation:

int radix = 8;
byte[] bitfield = new byte[0xffffffff/radix];
void F() throws FileNotFoundException{
    Scanner in = new Scanner(new FileReader("a.txt"));
    while(in.hasNextInt()){
        int n = in.nextInt();
        bitfield[n/radix] |= (1 << (n%radix));
    }

    for(int i = 0; i< bitfield.lenght; i++){
        for(int j =0; j<radix; j++){
            if( (bitfield[i] & (1<<j)) == 0) System.out.print(i*radix+j);
        }
    }
}

Case 2: 10 MB memory = 10 * 106 * 8 bits = 80 million bits

Solution: For all possible 16-bit prefixes, there are 2^16 number of
integers = 65536, we need 2^16 * 4 * 8 = 2 million bits. We need build
65536 buckets. For each bucket, we need 4 bytes holding all possibilities because
 the worst case is all the 4 billion integers belong to the same bucket.

Step 1: Build the counter of each bucket through the first pass through the file.
Step 2: Scan the buckets, find the first one who has less than 65536 hit.
Step 3: Build new buckets whose high 16-bit prefixes are we found in step2
through second pass of the file
Step 4: Scan the buckets built in step3, find the first bucket which doesnt
have a hit.

The code is very similar to above one.

Conclusion: We decrease memory through increasing file pass.


A clarification for those arriving late: The question, as asked, does not say that there is exactly one integer that is not contained in the file -- at least that's not how most people interpret it. Many comments in the comment thread are about that variation of the task, though. Unfortunately the comment that introduced it to the comment thread was later deleted by its author, so now it looks like the orphaned replies to it just misunderstood everything. It's very confusing. Sorry.

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29  
@trashgod, wrong. For 4294967295 unique integers you'll have 1 integer remaining. To find it, you should summ all integers and substract it from precalculated summ of all possible integers. –  Nakilon Aug 23 '11 at 1:22
52  
This is the second "pearl" from "Programming Pearls", and I would suggest you read the whole discussion in the book. See books.google.com/… –  Alok Singhal Aug 23 '11 at 2:29
6  
@Richard a 64 bit int would be more than large enough. –  cftarnas Aug 23 '11 at 17:24
54  
int getMissingNumber(File inputFile) { return 4; } (reference) –  johnny Aug 23 '11 at 17:28
9  
It doesn't matter that you can't store the sum of all integers from 1 to 2^32 because the integer type in languages like C/C++ ALWAYS preserves properties like associativity and communicativity. What this means is that although the sum won't be the right answer, if you calculate the expected with overflow, the actual sum with overflow, and then subtract, the result will still be correct (provided it itself does not overflow). –  thedayturns Aug 23 '11 at 22:48

37 Answers 37

Perhaps I'm completely missing the point of this question, but you want to find an integer missing from a sorted file of integers?

Uhh... really? Let's think about what such a file would look like:

1 2 3 4 5 6 ... first missing number ... etc.

The solution to this problem seems trivial.

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4  
It's not specified to be sorted. –  George Aug 24 '11 at 2:14

You don't need to sort them, just repeatedly partition subsets of them.

The first step is like the first pass of a quicksort. Pick one of the integers, x, and using it make a pass through the array to put all the values less than x to its left and values more than x to its right. Find which side of x has the greatest number of available slots (integers not in the list). This is easily computable by comparing the value of x with its position. Then repeat the partition on the sub-list on that side of x. Then repeat the partition on the sub-sub list with the greatest number of available integers, etc. Total number of compares to get down to an empty range should be about 4 billion, give or take.

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I may be reading this too closely, but the questions says "generate an integer which is not contained in the file". I'd just sort the list and add 1 to the max entry. Bam, an integer which is not contained in the file.

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2  
Why would you sort it if you just want to find the max? –  rfrankel Aug 24 '11 at 5:52
3  
@Klas Bogosort, of course. –  Brian Gordon Aug 24 '11 at 15:01

You could speed up finding the missing integers after reading the existing ones by storing ranges of unvisited integers in some tree structure.

You'd start by storing [0..4294967295] and every time you read an integer you splice the range it falls in, deleting a range when it becomes empty. At the end you have the exact set of integers that are missing in the ranges. So if you see 5 as the first integer, you'd have [0..4] and [6..4294967295].

This is a lot slower than marking bits so it would only be a solution for the 10MB case provided you can store the lower levels of the tree in files.

One way to store such a tree would be a B-tree with the start of the range as the key and the end of the range as the value. Worst case usage would be when you get all odd or even integers which would mean storing 2^31 values or tens of GB for the tree... Ouch. Best case is a sorted file where you'd only use a few integers for the whole tree.

So not really the correct answer but I thought I'd mention this way of doing it. I suppose I'd fail the interview ;-)

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I came up with the following algorithm.

My idea: go through all the whole file of integers once and for every bit position count its 0s and 1s. The amount of 0s and 1s must be 2^(numOfBits)/2, therefore, if the amount is less then expected we can use it of our resulting number.

For example, suppose integer is 32 bit, then we require

int[] ones = new int[32];
int[] zeroes = new int[32];

For every number we have to iterate though 32 bits and increase value of 0 or 1:

for(int i = 0; i < 32; i++){
   ones[i] += (val>>i&0x1); 
   zeroes[i] += (val>>i&0x1)==1?0:1;
}

Finally, after the file was processed:

int res = 0;
for(int i = 0; i < 32; i++){
   if(ones[i] < (long)1<<31)res|=1<<i;
}
return res;

NOTE: in some languages (ex. Java) 1<<31 is a negative number, therefore, (long)1<<31 is the right way to do it

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Old question, but I wonder about the "non-functional" requirements. In my opinion there should be a clue given - if this question was asked someplace else than in a book which then goes on to discuss all the possibilities with pros and cons. Often enough it seems to be askes in job interviews, leaving me puzzled as there can't be a definite answer given without knowing the soft requirements, i.e. "it must be very fast to lookup missing numbers, because it's used x times in a second".

I think such question might be possible to give a reasonable answer for.

  • I'd merge-sort all numbers into a new file, using 4 byte per int. Of course this will be slow to do at first. But it can be done with small memory amount (you don't need to necessarily keep all in RAM)
  • Use binary-search to check if the number exists n the presorted file. Since we remain 4-bytes per value this is no problem

disadvantages:

  • File size
  • Slow first sort - but only needed once

advantages:

  • very quick to lookup

So again, a very nice question for a book. But I think it's an odd question when asking for a single best solution, when the problem to be solved isn't fully known.

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Surely, and speaking with limited experience (just started learning java at Uni) you can run trhough one set (barrel) of int, and if number not found dispose of barrel. This would both free up space and run a check through each unit of data. If what you are looking for is found add it to a count variable. Would take a long time but, if you made multiple variables for each section and run the check count through each variable and ensure they are exiting/disposing at the same time, the variable storage should not increase? And will speed up the check process. Just a thought.

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