Fermat's factorisation in C++

For fun, I've been implementing some maths stuff in C++, and I've been attempting to implement Fermats Factorisation Method, however, I don't know that I understand what it's supposed to return. This implementation I have, returns `105` for the example number 5959 given in the Wikipedia article.

The pseudocode in Wikipedia looks like this:

One tries various values of a, hoping that is a square.

``````FermatFactor(N): // N should be odd
a → ceil(sqrt(N))
b2 → a*a - N
while b2 isn't a square:
a → a + 1    // equivalently: b2 → b2 + 2*a + 1
b2 → a*a - N //               a → a + 1
endwhile
return a - sqrt(b2) // or a + sqrt(b2)
``````

My C++ implementation, look like this:

``````int FermatFactor(int oddNumber)
{
double a = ceil(sqrt(static_cast<double>(oddNumber)));
double b2 = a*a - oddNumber;
std::cout << "B2: " << b2 << "a: " << a << std::endl;

double tmp = sqrt(b2);
tmp = round(tmp,1);
while (compare_doubles(tmp*tmp, b2))  //does this line look correct?
{
a = a + 1;
b2 = a*a - oddNumber;
std::cout << "B2: " << b2 << "a: " << a << std::endl;
tmp = sqrt(b2);
tmp = round(tmp,1);
}

return static_cast<int>(a + sqrt(b2));
}

bool compare_doubles(double a, double b)
{
int diff = std::fabs(a - b);
return diff < std::numeric_limits<double>::epsilon();
}
``````

What is it supposed to return? It seems to be just returning `a + b`, which is not the factors of `5959`?

EDIT

``````double cint(double x){
double tmp = 0.0;
if (modf(x,&tmp)>=.5)
return x>=0?ceil(x):floor(x);
else
return x<0?ceil(x):floor(x);
}

double round(double r,unsigned places){
double off=pow(10,static_cast<double>(places));
return cint(r*off)/off;
}
``````
-
`static_cast<double>(b2)`? Is there a reason that's there? Also how is `compare_doubles` defined? –  jli May 6 '12 at 20:51
@jli `b2` was an `int` on my earlier implementation, let me change it, it has no more reason for existance –  Tony The Lion May 6 '12 at 20:53
I would use integer types for `tmp` and `b2`. In order for the tests to pass, you need an integer square root of `b2` anyway. In fact, an implementation with ints for all local variables return 101. :) –  vhallac May 6 '12 at 20:54
What's that two-argument round function? –  Mat May 6 '12 at 20:59
@Mat I added it. –  Tony The Lion May 6 '12 at 21:00

Do note that you should be doing all those calculations on integer types, not on floating point types. It would be much, much simpler (and possibly more correct).

Your `compare_doubles` function is wrong. `diff` should be a `double`.

And once you fix that, you'll need to fix your test line. `compare_doubles` will return true if its inputs are "nearly equal". You need to loop while they are "not nearly equal".

So:

``````bool compare_doubles(double a, double b)
{
double diff = std::fabs(a - b);
return diff < std::numeric_limits<double>::epsilon();
}
``````

And:

``````while (!compare_doubles(tmp*tmp, b2))  // now it is
{
``````

And you will get you the correct result (`101`) for this input.

You'll also need to call your `round` function with `0` as "places" as vhallac points out - you shouldn't be rounding to one digit after the decimal point.

The Wikipedia article you link has the equation that allows you to identify `b` from `N` and `a-b`.

-
Heh, I missed the `int diff` bug. :) –  vhallac May 6 '12 at 21:21
Added reference, made CW for collective effort ;-) –  Mat May 6 '12 at 21:28

The two factors are (a+b) and (a-b). It is returning one of those. You can get the other easily.

``````N = (a+b)*(a-b)
a-b = N/(a+b)
``````
-
How am I supposed to get the other easily from `a + b` ?? –  Tony The Lion May 6 '12 at 21:02
I've extended my answer. –  Vaughn Cato May 6 '12 at 21:08
1. `compare_doubles` return true when they are close enough. So, the while loop condition is inverted.
2. The `round` function requires number of digits after decimal point. So you should use `round(x, 0)`.
As I've suggested, it is easier to use `int` for your datatypes. Here's working code implemented using integers.