# Maximum number of pairs from two sorted arrays

This is not an original problem. I had a complex problem which is now reduced to the following:

There are two sorted arrays, `A` and `B` with `m` and `n` elements respectively, `m = \Theta(n)` Can an algorithm that runs in `o(mn)` time find the maximum number of pairs such that `A[i]-B[j] <= T` where T is some constant? How can this be done?

edit:

1. The pairs should be disjoint, i.e. one element can be selected at most once.

2. The algorithm should run in little-o(mn) meaning that a solution that runs in mn time is not acceptable.

3. Is it also possible to find the pairs that we select?

Clarification:

If the arrays are `a_1, a_2, ..., a_m` and `b_1, b_2, ..., b_n`, I need to find pairs `(a_i, b_j)` such that `|a_i - b_j| <= T`. It is not allowed to choose an element more than once. How can we maximize the number of pairs given the arrays?

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Never seen little-O before: en.wikipedia.org/wiki/…. Wiki says `o(mn)` means complexity is dominated by `mn`, so that means `mn` time is acceptable, and `m+n` is not acceptible. Please clarify. –  Mooing Duck Oct 31 '11 at 17:40
@MooingDuck: No, there's an epsilon factor on the right-hand side - it means that it must run faster than mn. –  Aasmund Eldhuset Oct 31 '11 at 17:45
@AasmundEldhuset: I reread the article. I was wrong again. You're right. –  Mooing Duck Oct 31 '11 at 17:48
@MooingDuck Can you elaborate on how to do that? –  Pulkit Goyal Oct 31 '11 at 19:14
Nevermind, the new clarification has an absolute value, which means every answer on this page (as of right now) is incorrect. –  Mooing Duck Oct 31 '11 at 19:24

UPDATE 2:

The updated question (only use an element from either array once, get the pairs, and the absolute difference of the values must be below `T`) might be able to be done in O(n+m) time. I haven't thought through the algorithm below enough to decide if it will always get the maximum number of pairs or not, but it should in most cases:

``````int i = 0;
int j = 0;

while(i < A.length){
while(j < B.length){
if(A[i]-B[j] <= T){
if(A[i]-B[j] >= -1 * T){
j++;//don't consider this value the next time
}
break;
}
j++;
}
i++;
}
``````
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This can choose an element from B more than once. Moreover, there is no guarantee that it will choose a maximum set of pairs. –  Pulkit Goyal Oct 31 '11 at 19:12
The latest update to the question says `|a_i - b_j| <= T`, an absolute value has been added. –  Mooing Duck Oct 31 '11 at 19:15
@PulkitGoyal: Actually, since both i and j never decrease, it will never use any element in `A` or `B` more than once. –  Mooing Duck Oct 31 '11 at 19:17
@MooingDuck Ah! Sorry, my mistake. But still it doesn't work with the absolute value of difference. As as example, consider the following arrays: `20,30` and `35,70` with `T=10`. The algorithm will not select any pair. However, optimally the pair `(30,35)` should have been selected. –  Pulkit Goyal Oct 31 '11 at 19:25
@PulkitGoyal: I wonder how I never noticed that bug in this code. You're right, the correct answer is slightly more complicated. –  Mooing Duck Oct 31 '11 at 19:29

In `O(n lg n) = O(m lg m)`: Create a balanced binary search tree from the elements of `A`, and store in each node the index of an element together with the element value. For each element of `B`, search for the greatest value that is less than or equal to `B[j] + T`. The index of this number will tell you how many numbers are smaller than or equal to this number.

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"Create a balanced binary search tree" - Doesn't that take time itself? –  GigaWatt Oct 31 '11 at 17:20
I am looking for distinct pairs meaning that a number once selected can't be selected again. –  Pulkit Goyal Oct 31 '11 at 17:40
@GigaWatt: Yes, but only `O(n lg n)`. –  Aasmund Eldhuset Oct 31 '11 at 17:45
@AasmundEldhuset I don't see how this will produce the correct number of pairs because it can take an element more than once. –  Pulkit Goyal Oct 31 '11 at 19:14

If you want the number of pairs matching`|A[i]-B[j]| <= T`, where each `A[i]` and `B[j]` are used only once in all pairs:

``````int lastB = 0;
int result=0;
for(int a = 0; a<A.size(); ++a) {
const int minB = A[a] - T;
while(lastB<B.size() && B[lastB] < minB)
++lastB;
const int maxB = A[a] + T;
if (lastB<B.size() && B[lastB] > minB) {
++lastB;
++result;
}
}
return result;
``````

This algorithm scans minimal ranges in `B`, and makes sure that no element in `B` is used twice.

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Your solution finds the maximum number of pairs that I can obtain using A_max as the first element always. But I need the elements to be distinct. This means that once you select an element from one array, you are not allowed to choose that again. –  Pulkit Goyal Oct 31 '11 at 18:12
Since all other elements are less than `A_max`, and I never return more than `A_max` as the result, you'll find that this returns the correct number anyway. –  Mooing Duck Oct 31 '11 at 18:22
I don't see how it can return the correct result. e.g. consider the following arrays: `1, 2, 3, 1000` and `999, 1000, 1001, 1002` and threshold 5. If I understand your algorithm correctly, it will return the number of pairs as 4 whereas here only one pair is possible. –  Pulkit Goyal Oct 31 '11 at 19:10
It will return 4, and there are four by the original question. (1,999) (2,1000) (3,1001) (1000,1002) The equation was `A[i]-B[j] <= T`, and `2-1000<=5` is definitely true. I just noticed your edit now shows an absolute value, in which case this algorithm is flawed. Then use Briguy37's answer, it's next fastest. –  Mooing Duck Oct 31 '11 at 19:13
@PulkitGoyal: Upon discovering that Briguy37's has a (major) bug, I replaced my answer with a fixed version of his algorithm. –  Mooing Duck Oct 31 '11 at 19:40