# unbiased random number generator

I am generating the random numbers in a domain by using the following code. When I plot them they look grouped at the right. I could show you my plot but I do not know how to upload it. Basically I associate a some data value to the respective point. May you tell me how can I correct it please? My complete code is

``````#include <iostream>
#include <cmath>
#include <fstream>
#include <sstream>
#include <string>
#include <cstdlib>
#include <cstdio>
#include <time.h>

using namespace std;
string int2string1( int l );
string int2string2( int m );
int main ()
{
ofstream outFile;
ofstream myimp;
string filename;
srand((unsigned)time(0));
int nx = 400;
int ny = 200;
int i,j,ix,iy,xm,ym,nimp,nfam[nx][ny];
for (i=0; i<nx; i++)
{
for (j=0; j<ny; j++)
{
vimp[i][j] = 0.0;
}
}
xm = 0;
ym = 0;
vo = 0.08;
sig = 4.0;
myimp.open("imp.dat");
for(i=1; i<nx-1; i++)
{
for(j=1; j<ny-1; j++)
{
rnd = (random() %1000 + 1)*1.0/1000.0;
if(rnd>0.99)
{
xm = random() % 398 + 1;              /***1 through 399 ***/
ym = random() % 198 + 1;              /***1 through 199 ***/
for(ix=xm-5; ix<=xm+5; ix++)
{
for(iy=ym-5; iy<=ym+5; iy++)
{
rr = sqrt(pow(ix-xm,2.)+pow(iy-ym,2.));
{
vimp[ix][iy] = vo*1.6e-19;
}
}
}
}
myimp<<i<<"\t\t"<<j<<"\t\t"<<xm<<"\t\t"<<ym<<"\t\t"<<nfam[i][j]<<"\t\t"<<vimp[i][j]*6.23e18<<"\n";
}
}
myimp.close();
return 0;
}
``````
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Code, not codes. And those numbers are not random. –  user405725 Nov 16 '11 at 19:19
`rand() % N` would only be uniform for `N = 2^x` –  K-ballo Nov 16 '11 at 19:19
Why do you think its biased? –  Dani Nov 16 '11 at 19:21
When I plot them the look grouped at the right. I could show you my plot but I do not know how to upload the plot. –  nagendra Nov 16 '11 at 19:27
Unless you have a lot of time to burn, I'd leave the random number generation to someone else, like `<random>`. –  Kerrek SB Nov 16 '11 at 19:32

Basically, the `rand() % N` expression introduces a bias if `RAND_MAX` is not a multiple of `N`. It projects numbers in `[0,RAND_MAX]` onto the range `[0,N]` with a non-uniform fashion.

Suppose that `RAND_MAX=4` and `N=2`. Then, there are 3 numbers that produce `0` (`0`, `2` and `4`) and 2 numbers that produce `1` (`1` and `3`). Thus, you have 60% change of getting `0` and 40% chance of getting `1`.

The correct way to implement an unbiased projection from `[0,RAND_MAX]` onto `[0,N]` is by invoking `rand()` repeatedly until the random value is in the desired interval. See the documentation for `Random.nextInt()` in Java (Credits to Oli Charlesworth for the link).

Assuming that, for sheer execution speed, you want to avoid calling `rand()` multiple times, the way to generate the least bias possible is to use an intermediate `double` number, such as:

``````double myrand ()
{
return double(rand()) / double(RAND_MAX);
}

int myrand ( int max )
{
return int(myrand() * double(max));
}
``````

Edit: Here's a simple class that will project outputs of the `rand()` function in to a range `[0,N]` with no less bias than `rand()`.

``````class BoundedRandom
{
const int m_maximum;
const int m_divisor;
public:
BoundedRandom ( int maximum )
: m_maximum(maximum),
m_divisor(RAND_MAX/(maximum+1))
{}

int operator() ()
{
int result = rand() / m_divisor;
while ( result > m_maximum ) {
result = rand() / m_divisor;
}
return (result);
}
};
``````

Caution: not tested or debugged.

You can use this generator like this:

``````BoundedRandom randomx(398);
BoundedRandom randomy(198);
// ...
xm = randomx() + 1; // 1 through 399
ym = randomy() + 1; // 1 through 199
``````
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"Suppose that RAND_MAX=4 and N=2." They aren't. When you plug in the real values the bias you talk of is negligible. –  David Heffernan Nov 16 '11 at 19:36
@DavidHeffernan: when `RAND_MAX` and `N` are larger, the bias is definitely smaller. Whether or not this is negligible depends on the specific values of `RAND_MAX`, `N` and the application. –  André Caron Nov 16 '11 at 20:55
This won't eliminate the bias either. –  Oliver Charlesworth Nov 16 '11 at 21:38
@OliCharlesworth: Care to elaborate? There is still bias in the fact that `RAND_MAX` slots cannot be projected onto `N` slots without introducing some bias if (`RAND_MAX%N!=0`). However, this is probably the only fair way to project the results from `rand()` onto `N` slots. –  André Caron Nov 16 '11 at 22:35
@AndréCaron: Ok, -1 removed! BTW, it's possible to do better than calling rand() until it falls into the output range. For instance, if your desired range is 0->9 (inclusive), then you can sample rand() until you get a number in the range 0->32759 (inclusive), and then divide or modulo. –  Oliver Charlesworth Nov 16 '11 at 23:07
``````int r = rand() % N;
``````

Does not lead to a uniform distribution1

Instead, I recommend just using C++ TR1 (or boost) random:

``````#include <random>

std::mt19937 rng(seed);
std::uniform_int_distribution<int> gen(0, N); // uniform, unbiased

int r = gen(rng);
``````

Or to generate floating point numbers of any kind:

``````std::uniform_real_distribution<double> gen(-2*PI, +2*PI); // uniform, unbiased
double r = gen(rng);
``````

1 Backgound, e.g.: Using `rand()`

If you're really stuck with using rand() and N which doesn't evenly divide `MAX_RAND`, the page has some hints on how to achieve somewhat better integer distributions using other formulae. Note that I'd steer you to André Caron's answer instead.

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+1 for TR1 random. –  Mark B Nov 16 '11 at 19:37
`int r = rand() / ( RAND_MAX / N + 1 );` simply distributes the bias evenly. –  Mooing Duck Nov 16 '11 at 19:38
Nice link to the "Using `rand()`" page! –  André Caron Nov 16 '11 at 19:40
Don't you mean "in the range [M,N)"? –  Robᵩ Nov 16 '11 at 19:45
Note, however, that all the wrappers you've posted here do/will introduce bias unless RAND_MAX is an exact multiple of the requested range (which is rare -- often impossible). We can only hope that those in the standard library do better. –  Jerry Coffin Nov 16 '11 at 21:10

C++11 introduced random number generators that will almost certainly do a better job than rand. Here's an example using the mersenne twister algorithm, but there are others to choose from depending on the characteristics you need.

``````// [1, 399]
auto random_int = std::bind(std::uniform_int_distribution<int>(1,399),std::mt19937());

// [0, 1.0)
auto random_double = std::bind(std::uniform_real_distribution<double>(0.0,1.0),std::mt19937());
``````
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`rand() % 398 + 1; /*** 1 through 399 ***/` will generate numbers 1 through 398, because ``rand() % 398` will be 0-397 (398 % 398 is 0). Same for the next line.

As an aside, note that using `pow` with a constant power of two can cost an order of magnitude more CPU than simply writing out the multiplication and should usually be avoided.

Also since you only use `rnd` in a single comparison against the constant `0.99` you should just work that instead as integer math, as the conversion and comparison in floating point will cost rather more than just doing an integer comparison. For example instead the two lines (`rnd =` and `if`) use `if((rand() % 100) == 0)` which while slightly biased should accurately indicate your intention.

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That is NOT unbiased. –  sehe Nov 16 '11 at 19:30
@sehe No more biased than the original code, more performant, and I did indicate that it has a slight bias. Almost certainly the real problem is that 399 and 199 can never be generated. –  Mark B Nov 16 '11 at 19:33
You are right. My point is each no has to be independent, am I right? My numbers look densely grouped at right than at the left. Each time I run the code I get different distribution but the trend stays the same. –  nagendra Nov 16 '11 at 19:36
Yeah, granted, but the question is about the bias. We'll let the OP decide whether the real problem is indeed with those extreme values (not so sure. I don't see how that fits the complaint ('look grouped to the right') though –  sehe Nov 16 '11 at 19:39
I intend to show the distribution that I get over and over again. Is there any way to present that to you please so that it would be more explicit what I am saying. –  nagendra Nov 16 '11 at 20:20

I've read through your code and cannot find anything to bias it to the right. If anything, there's a statistical bias to the left (the left two thirds should be favored by 0.6% ish).

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