This is essentially the solution proposed by @Matthias with an added pointer to catch duplicates. If there is a string of duplicate values in arr2
, searchStart
will always point to the one with the highest index so that we can check the entire string against the next value in arr1
. All values in arr1
are explicitly checked, so no extra duplicate handling is required.
int pairCount = 0;
for (int base=0, searchStart=arr2Size-1; base<arr1Size; base++) {
int searchCurrent = searchStart;
while (arr1[base]+arr2[searchCurrent] > 0) {
searchCurrent--;
if (searchCurrent < 0) break;
}
searchStart=searchCurrent;
if (searchStart < 0) break;
while (arr1[base]+arr2[searchCurrent] == 0) {
std::cout << "arr1[" << base << "] + arr2[" << searchCurrent << "] = ";
std::cout << "[" << arr1[base] << "," << arr2[searchCurrent] << "]\n";
pairCount++;
searchCurrent--;
}
}
std::cout << "pairCount = " << pairCount << "\n";
Given the arrays:
arr1[] = {-5, -3, -3, -2, -1, 0, 2, 4, 4, 5, 8};
arr2[] = {-7, -5, -5, -4, -3, -2, 1, 3, 4, 5, 6, 7, 8};
we get:
arr1[0] + arr2[9] = [-5,5]
arr1[1] + arr2[7] = [-3,3]
arr1[2] + arr2[7] = [-3,3]
arr1[4] + arr2[6] = [-1,1]
arr1[6] + arr2[5] = [2,-2]
arr1[7] + arr2[3] = [4,-4]
arr1[8] + arr2[3] = [4,-4]
arr1[9] + arr2[2] = [5,-5]
arr1[9] + arr2[1] = [5,-5]
pairCount = 9
Now we come to the question of time complexity. The construction of searchStart
is such that for each value in arr1
can have an extra compare with one value in arr2
(but no more than 1). Otherwise, for arrays with no duplicates this checks each value in arr2
exactly once, so this algorithm runs in O(n)
.
If duplicate values are present, however, it complicates things a bit. Consider the arrays:
arr1 = {-3, -3, -3}
arr2 = { 3, 3, 3}
Clearly, since all O(n²)
pairs equal zero, we have to count all O(n²)
pairs. This means that in the worst case, the algorithm is O(n²)
and this is the best we can do. It is possibly more constructive to say that the complexity is O(n + p)
where p
is the number of matching pairs.
Note that if you only want to count the number of matches rather than printing them all, you can do this in linear time as well. Just change when searchStart
is updated to when the last match is found and keep a counter that equals the number of matches found for the current searchStart
. Then if the next arr1[base]
matches arr2[searchStart]
, add the counter to the number of pairs.