# define and use a discrete probability density function in c++

I want to define a specific probability density function (pdf) for n numbers at C++ and then pick some of them later in my code.

my pdf is : P (x) = (1/logn) * f(x)^(-2)

f(x) has a deterministic number that is already determined for each x earlier in my code.

I prefer to use standard library function, since I should use my program in a computer cluster that using additional libraries such as boost more likely produces further issues in that cluster.

my initial code that I have found is:

  for(int x=1;x<n+1;x++){
// I calculate all f(x) and therefore P(x) here
}
std::default_random_engine generator;
std::discrete_distribution<int> distribution { .. not sure how to use P(x)s here .. };

int prob[n]={};

for (int i=0; i<n; ++i) {
int number = distribution(generator);
++prob[number];
}


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So, the possible numbers are 1 to n ? Or is this just an example? –  deviantfan Mar 1 '14 at 1:45
sorry for delay. yes they are 1 to n. this is my actual code –  Omid Mar 1 '14 at 2:57

You can now construct vector with weights:

std::vector< double> weights( n);
for( int i = 0; i < n; ++i) {
weights[i] = pdf( i + 1);
}

std::default_random_engine generator;
std::discrete_distribution<int> distribution( weights.begin(), weights.end()) ;

int prob[n]={};

for ( int i=0; i<n; ++i) {
int number = distribution( generator);
++prob[number];
}


This will generate starting from 0, this is how discrete_distribution works, but you can assume with no loss of correctness that values are calculated for a range 1, ..., n (weights are calculated for 1, ..., n).

example

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Thanks a lot for the great answer. –  Omid Mar 1 '14 at 8:19
I lost the idea that by having this pdf ready, how could I pick a number from 1 to n based on this pdf and assign it to for example j? –  Omid Mar 1 '14 at 23:21
I don't understand. Can you clarify? –  AB_ Mar 1 '14 at 23:55
that is a very introductory question actually, but Im confused. I mean, at the end how could I generate one instance from i=1 to n based on this distribution and say: int j = the generated value. –  Omid Mar 2 '14 at 0:08
int number = distribution( generator); will generate a number in range [0,...,n-1] for you, and you know how this number corresponds to your original domain. If I get this right from what you mentioned your domain is X=(1,...,n), so your mapping is f(n)=n+1=distribution( generator) + 1. Example: if you got 2 from a call to distribution( generator) than your number is 3. –  AB_ Mar 2 '14 at 0:15