# Determine whether or not there exist two elements in Set S whose sum is exactly x - correct solution?

Taken from Introduction to Algorithms

Describe a Θ(n lg n)-time algorithm that, given a set S of n integers and another integer x, determines whether or not there exist two elements in S whose sum is exactly x.

This is my best solution implemented in Java so far:

``````    public static boolean test(int[] a, int val) {
mergeSort(a);

for (int i = 0; i < a.length - 1; ++i) {
int diff = (val >= a[i]) ? val - a[i] : a[i] - val;

if (Arrays.binarySearch(a, i, a.length, diff) >= 0) {
return true;
}
}

return false;
}
``````

Now my 1st question is: Is this a correct solution? From my understanding, mergeSort should perform the sort in O(n lg n), the loop should take O(n lg n) (n for the iteration multiplied by O(lg n) for the binary search, resulting in O(2n lg n), so it should be correct.

My 2nd question is: Are there any better solutions? Is sorting the array essential?

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Are you allowed to use hash sets? If so, then you can get to O(n), see below. – Itay Maman Jan 31 '10 at 14:41
`(val >= a[i]) ? val - a[i] : a[i] - val` this what `Math.abs()` is for :) – BlueRaja - Danny Pflughoeft Jan 31 '10 at 16:40
Yes, `Math.abs` is for that, but I would say even more: it's not needed here. In fact is wrong. `diff` must always be assigned the value `val-a[i]` regardless of whether this difference is positive or negative. – Ernesto Jul 21 '11 at 19:13
as suggested in a few of the answers below there is a better O(n) sol'n given a few assumptions on the input. – Greenish Apr 12 '14 at 22:31

Your solution seems fine. Yes you need to sort because its a pre requisite for binary search. You can make a slight modification to your logic as follows:

``````public static boolean test(int[] a, int val)
{
Arrays.sort(a);

int i = 0;            // index of first element.
int j = a.length - 1; // index of last element.

while(i<j)
{
// check if the sum of elements at index i and j equals val, if yes we are done.
if(a[i]+a[j] == val)
return true;
// else if sum if more than val, decrease the sum.
else if(a[i]+a[j] > val)
j--;
// else if sum is less than val, increase the sum.
else
i++;
}
// failed to find any such pair..return false.
return false;
}
``````
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Your analysis is correct, and yes you must sort the array or else binary search does not work.

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I do think I have spotted a minor bug in your implementation, but testing should uncover that one quickly.

The approach looks valid, and will reach the desired performance. You might simplify it by replacing the iterative binary search with a scan through the array, in effect replacing the binary search by a linear search that resumes where the previous linear search left off:

``````int j = a.length - 1;
for (int i = 0; i < a.length; i++) {
while (a[i] + a[j] > val) {
j--;
}
if (a[i] + a[j] == val) {
// heureka!
}
}
``````

This step is O(n). (Proving that is left as an exercise for you.) Of course, the entire algorithm still takes O(n log n) for the merge sort.

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is heureka a mix of heuristics and eureka ? – Valentin Rocher Jan 31 '10 at 14:36
@Bishiboosh: No its the German transliteration of the Greek word. I didn't know the English transliteration dropped the H. The things you learn of stack overflow ... :-) – meriton Jan 31 '10 at 14:47
1. This is correct; your algorithm will run in O(n lg n) time.

2. There is a better solution: your logic for calculating diff is incorrect. Regardless of whether `a[i]` is greater than or less than `val`, you still need diff to be `val - a[i]`.

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Yes! I was reading this thread and was wondering if nobody noticed that the diff must always be `va - a[i]`. – Ernesto Jul 21 '11 at 19:10

Here's an O(n) solution using a hash-set:

``````  public static boolean test(int[] a, int val) {
Set<Integer> set = new HashSet<Integer>();

// Look for val/2 in the array
int c = 0;
for(int n : a) {
if(n*2 == val)
++c
}
if(c >= 2)
return true; // Yes! - Found more than one

// Now look pairs not including val/2
for (int n : a) {
if(n*2 == val)
continue;
if(set.contains(val - n))
return true;
}

return false;
}
``````
-
And what if I now replied that your comment makes no sense either? Do you think this discussion would get anywhere? To clarify: The proof that a HashSet offers O(1) lookup assumes a good distribution of hash values, which depends on your input. If all numbers in the input get the same bucket in the hashSet, the HashSet will be pretty slow (java.util.HashSet uses a LinkedList to hold the contents of a bucket). Usually, your input will distribute well, but not always. Hence, a hashSet does not guarantee a constant worst-case lookup complexity. – meriton Jan 31 '10 at 15:06
@Itay: true, `hashCode(i)==i`, but HashSet doesn't use 2^32 buckets, it uses fewer than that. So the real hash function used is a modulus over the number of buckets. AFAIK the Java HashSet re-hashing strategy doesn't guarantee a worst-case O(1) elements per bucket (except in the trivial sense that almost anything done on bounded-size integers is O(1)), since it's based on load factor alone, not on the occupancy of the worst bucket in the table. – Steve Jessop Jan 31 '10 at 15:34
@OldEnthusiast: meritor is right, this is not `O(n)`, because Hash-table lookups are not worst-case `O(1)` (which means they are not worst-case `Θ(1)`), they are average-case `Θ(k/n)` (see en.wikipedia.org/wiki/Hash_table#Performance_analysis). When a problem says "find an O(something)-time algorithm," it always means worst-case. However, I will not give a -1, since, though it is not the answer to this particular problem, it is the solution I would use if I encountered this problem in the real-world. – BlueRaja - Danny Pflughoeft Jan 31 '10 at 16:31
@danben: I understand that; but when they don't state "worst-case," "average-case," or "best-case" in a problem for an Algorithms class, it's always implicitly understood that the problem is asking for "worst-case." This answer is very good in the average case, but not in the worst-case, which is where the confusion comes from, because the OP did not explicitly say one or the other. – BlueRaja - Danny Pflughoeft Jan 31 '10 at 17:37
@danben: presumably if Itay is allowed to assume average case instead of worst case, then I'm allowed to assume best case instead of worst case, and present an algorithm which is Theta(n) best case but Theta(n^2) average and worst case? The reason worst case should be assumed unless stated otherwise is precisely to bar students from this kind of hijinks. – Steve Jessop Jan 31 '10 at 23:18

There's another very fast solution: Imagine you have to solve this problem in Java for about 1 billions integers. You know that in Java integers go from -2*31+1 to +2*31.

Create an array with 2**32 billion bit (500 MB, trivial to do on today's hardware).

Iterate over your set: if you have an integer, set corresponding bit to 1.

O(n) so far.

Iterate again over your set: for each value, check if you have a bit set at "current val - x".

If you have one, you return true.

Granted, it needs 500 MB of memory.

But this shall run around any other O(n log n) solution if you have, say, to solve that problem with 1 billion integers.

O(n).

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So you allocate, and zero-out, 500 MB of memory, to solve this problem for n=10000? – meriton Jan 31 '10 at 15:01
I quote from this answer: "Imagine you have to solve this problem in Java for about 1 billions integers". I think it's pretty clear that when OldEnthusiast says "very fast", he means very fast for large problems, i.e. low complexity. This is not the most efficient solution for n=1: `return false;` is ;-) – Steve Jessop Jan 31 '10 at 15:43
+1 poster asked for Θ(n log n) time, this trumps even that; he said nothing about space constraints :) – BlueRaja - Danny Pflughoeft Jan 31 '10 at 16:25
-1. This does not work for all input and for small input, the hidden constant is huge. – Aryabhatta Jan 31 '10 at 18:10
@Moron: The problem also doesn't say anything about memory constraints, so search the list for the largest `n` then create an array of that size and run this algorithm. That is `O(k)` (where k is the largest value), due to the zeroing of the array. Algorithms such as this are known as pseudo-polynomial (en.wikipedia.org/wiki/Pseudo-polynomial_time), and while helpful in some (many) cases in the real world, it is not a solution to this problem as `k` is unrelated to `n`. – BlueRaja - Danny Pflughoeft Feb 1 '10 at 2:33

A simple solution is, after sorting, move pointers down from both ends of the array, looking for pairs that sum to x. If the sum is too high, decrement the right pointer. If too low, increment the left one. If the pointers cross, the answer is no.

-

Here's is an alternate solution, by adding few more conditions into mergesort.

``````public static void divide(int array[], int start, int end, int sum) {

if (array.length < 2 || (start >= end)) {
return;
}
int mid = (start + end) >> 1; //[p+r/2]
//divide
if (start < end) {
divide(array, start, mid, sum);
divide(array, mid + 1, end, sum);
checkSum(array, start, mid, end, sum);
}
}

private static void checkSum(int[] array, int str, int mid, int end, int sum) {

int lsize = mid - str + 1;
int rsize = end - mid;
int[] l = new int[lsize]; //init
int[] r = new int[rsize]; //init

//copy L
for (int i = str; i <= mid; ++i) {
l[i-str] = array[i];
}
//copy R
for (int j = mid + 1; j <= end; ++j) {
r[j - mid - 1] = array[j];
}
//SORT MERGE
int i = 0, j = 0, k=str;
while ((i < l.length) && (j < r.length) && (k <= end)) {
//sum-x-in-Set modification
if(sum == l[i] + r[j]){
System.out.println("THE SUM CAN BE OBTAINED with the values" + l[i] + " " + r[j]);
}
if (l[i] < r[j]) {
array[k++] = l[i++];
} else {
array[k++] = r[j++];
}
}
//left over
while (i < l.length && k <= end) {
array[k++] = l[i++];
//sum-x-in-Set modification
for(int x=i+1; x < l.length; ++x){
if(sum == l[i] + l[x]){
System.out.println("THE SUM CAN BE OBTAINED with the values" + l[i] + " " + l[x]);
}
}
}
while (j < r.length && k <= end) {
array[k++] = r[j++];
//sum-x-in-Set modification
for(int x=j+1; x < r.length; ++x){
if(sum == r[j] + r[x]){
System.out.println("THE SUM CAN BE OBTAINED with the values" + r[j] + " " + r[x]);
}
}
}
}
``````

But the complexity of this algorithm is still not equal to THETA(nlogn)

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