# How does this c++ implementation of bead sort algorithm work?

I have been trying to understand this code for hours unsuccessfully. I wrote my own version of bead sort algorithm however it is so slow. I want to understand why this one works so much more quickly. Here's info about the bead sort algorithm:

``````#include <iostream>
#include <vector>

using std::cout;
using std::vector;

void distribute(int dist, vector<int> &List) {
if (dist > List.size() )
List.resize(dist); //resize if too big for current vector

for (int i=0; i < dist; i++)
List[i]++;
}

vector<int> beadSort(int *myints, int n) {
vector<int> list, list2, fifth (myints, myints + n);
cout << "sakums\n";
cout << myints<< "\n";
//   for (vector<int>::iterator it = fifth.begin(); it != fifth.end(); ++it) cout << " " << *it << "\n";
cout << "beigas\n";

cout << "#1 Beads falling down: ";
for (int i=0; i < fifth.size(); i++)
distribute (fifth[i], list);
cout << '\n';

cout << "\nBeads on their sides: ";
for (int i=0; i < list.size(); i++)
cout << " " << list[i];
cout << '\n';

//second part

cout << "#2 Beads right side up: ";
for (int i=0; i < list.size(); i++)
distribute (list[i], list2);
cout << '\n';

return list2;
}

int main() {
int myints[] = {734,3,1,24,324,324,32,432,42,3,4,1,1};
cout << "Sorted list/array";
for(unsigned int i=0; i<sorted.size(); i++)
cout << sorted[i] << ' ';
system("PAUSE");
return 0;
}
``````
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What does `distribute` do? –  Robert Harvey Dec 4 '12 at 22:12
Would it be a waste of time to suggest a debugger - nothing would compre to you seeing how it works rather than being told... –  Caribou Dec 4 '12 at 22:19
@John: Do you know how the bead sort works in general? –  Mooing Duck Dec 4 '12 at 22:20
Maybe a better way would be to post your implementation and then ask why it is slow? –  Caribou Dec 4 '12 at 22:38
@John: This is the most obvious implementation I can think of. If it's faster than yours, that must be because you did something slow in your version. I can't tell you why this is faster, because this is really the only way to do it. Actually, how do you know that this is faster, and by how much? –  Mooing Duck Dec 4 '12 at 23:32

Because of how distribute works:

Each of the other numbers contribute "beads" to the slots - there are 13 numbers so slot 1 has 13 in it when it finishes the first pass.

it "distributes" beads in "columns" I.e when you print it on its side, there are now 734 slots - the largest number.

When distribute runs again it shifts the "beads" down by summing the columns - it will perform a number of additions dependent on the max element * The number of numbers - plus memory allocations

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