I want to integrate a probability density function from `(-\infty, a]`

because the cdf is not available in closed form. But I'm not sure how to do this in C++.

This task is pretty simple in Mathematica; All I need to do is define the function,

```
f[x_, lambda_, alpha_, beta_, mu_] :=
Module[{gamma},
gamma = Sqrt[alpha^2 - beta^2];
(gamma^(2*lambda)/((2*alpha)^(lambda - 1/2)*Sqrt[Pi]*Gamma[lambda]))*
Abs[x - mu]^(lambda - 1/2)*
BesselK[lambda - 1/2, alpha Abs[x - mu]] E^(beta (x - mu))
];
```

and then call the `NIntegrate`

Routine to numerically integrate it.

```
F[x_, lambda_, alpha_, beta_, mu_] :=
NIntegrate[f[t, lambda, alpha, beta, mu], {t, -\[Infinity], x}]
```

Now I want to achieve the same thing in C++. I using the routine `gsl_integration_qagil`

from the gsl numerics library. It is designed to integrate functions on the semi infinite intervals `(-\infty, a]`

which is just what I want. But unfortunately I can't get it to work.

This is the density function in C++,

```
density(double x)
{
using namespace boost::math;
if(x == _mu)
return std::numeric_limits<double>::infinity();
return pow(_gamma, 2*_lambda)/(pow(2*_alpha, _lambda-0.5)*sqrt(_pi)*tgamma(_lambda))* pow(abs(x-_mu), _lambda - 0.5) * cyl_bessel_k(_lambda-0.5, _alpha*abs(x - _mu)) * exp(_beta*(x - _mu));
}
```

Then I try and integrate to obtain the cdf by calling the gsl routine.

```
cdf(double x)
{
gsl_integration_workspace * w = gsl_integration_workspace_alloc (1000);
double result, error;
gsl_function F;
F.function = &density;
double epsabs = 0;
double epsrel = 1e-12;
gsl_integration_qagil (&F, x, epsabs, epsrel, 1000, w, &result, &error);
printf("result = % .18f\n", result);
printf ("estimated error = % .18f\n", error);
printf ("intervals = %d\n", w->size);
gsl_integration_workspace_free (w);
return result;
}
```

However `gsl_integration_qagil`

returns an error, `number of iterations was insufficient`

.

```
double mu = 0.0f;
double lambda = 3.0f;
double alpha = 265.0f;
double beta = -5.0f;
cout << cdf(0.01) << endl;
```

If I increase the size of the workspace then the bessel function will not evaluate.

I was wondering if there was anyone that could give me any insight to my problem. A call to the corresponding Mathematica function F above with `x = 0.01`

returns `0.904384`

.

Could it be that the density is concentrated around a very small interval (i.e. outside of `[-0.05, 0.05]`

the density is almost `0`

, a plot is given below). If so what can be done about this. Thanks for reading.

`cdf(0) = 1/2`

. Remember that the cdf evaluated at x is the same as the integral from 0 to x plus the cdf evaluated at 0. Of course, I'm going from the shape of the graph, it may not actually be exactly symmetric. – Ben Voigt May 28 '12 at 4:00