# Reducing Integer Fractions Algorithm - Solution Explanation?

This is a followup to this problem:

Reducing Integer Fractions Algorithm

Following is a solution to the problem from a grandmaster:

``````#include <cstdio>
#include <algorithm>
#include <functional>

using namespace std;

const int MAXN = 100100;
const int MAXP = 10001000;

int p[MAXP];

void init() {
for (int i = 2; i < MAXP; ++i) {
if (p[i] == 0) {
for (int j = i; j < MAXP; j += i) {
p[j] = i;
}
}
}
}

void f(int n, vector<int>& a, vector<int>& x) {
a.resize(n);
vector<int>(MAXP, 0).swap(x);
for (int i = 0; i < n; ++i) {
scanf("%d", &a[i]);
for (int j = a[i]; j > 1; j /= p[j]) {
++x[p[j]];
}
}
}

void g(const vector<int>& v, vector<int> w) {
for (int i: v) {
for (int j = i; j > 1; j /= p[j]) {
if (w[p[j]] > 0) {
--w[p[j]];
i /= p[j];
}
}
printf("%d ", i);
}
puts("");
}

int main() {
int n, m;
vector<int> a, b, x, y, z;

init();
scanf("%d%d", &n, &m);
f(n, a, x);
f(m, b, y);
printf("%d %d\n", n, m);
transform(x.begin(), x.end(), y.begin(),
insert_iterator<vector<int> >(z, z.end()),
[](int a, int b) { return min(a, b); });
g(a, z);
g(b, z);

return 0;
}
``````

It isn't clear to me how it works. Can anyone explain it?

The equivilance is as follows:

``````a is the numerator vector of length n
b is the denominator vector of length m
``````
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Try to understand each function one at a time. It's not that hard. –  Raymond Chen Sep 10 '12 at 21:43
@RaymondChen: It was just the p array that wasn't clear, I didn't realize what it was so the for loop `for (int j = i; j > 1; j /= p[j])` was baffling. –  Andrew Tomazos Sep 10 '12 at 21:47

`init` simply fills the array `P` so that `P[i]` contains the largest prime factor of `i`.

`f(n,a,x)` fills `x` with the number of times a number in a is divisible by each prime, counting powers multiple times. In effect it computers the prime factorization of the product of `a`.

`g(v,w)` takes a list of numbers `v` and a prime factorization `w` and divides out any element in v with a common factor in w until they share no common factors. (Dividing the prime factorization means subtracting the power by 1).

So now we have `main`. First it initializes the `P` array and reads in the data lengths (strangely it never appears to read in the data itself). Then it stores the prime factorizations of the products of elements in a and b in x and y respectively. Then it uses a lambda expression in a loop to take the element wise minimum of these two factorizations, giving the factorization of the greatest common factor. Finally it divides out elements in a and b by this common factor.

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p[i] is the largest prime factor I think. –  Andrew Tomazos Sep 10 '12 at 21:45
Yep, the largest it is. –  Daniel Fischer Sep 10 '12 at 21:46
Oops, you're right I missed that. Though it doesn't affect the overall algorithm. –  Antimony Sep 10 '12 at 21:47
There's a scanf in f() that reads the data. –  NovaDenizen Sep 11 '12 at 2:47

Figured it out:

p[i] is the highest prime factor of i

So the loop:

``````for (int i = x; i > 1; i /= p[i])
{
p[i] is prime factor of x;
}
``````

will iterate once for every prime factor of x;

He is then using that to count prime factors.

And then using them to divide as appropriate numerator/denominator terms.

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