I would like to compute the convolution of two probability distributions in R and I need some help. For the sake of simplicity, let's say I have a variable x that is normally distributed with mean = 1.0 and stdev = 0.5, and y that is log-normally distributed with mean = 1.5 and stdev = 0.75. I want to determine z = x + y. I understand that the distribution of z is not known a priori.

As an aside the real world example I am working with requires addition to two random variables that are distributed according to a number of different distributions.

Does anyone know how to add two random variables by convoluting the probability density functions of x and y?

I have tried generating n normally distributed random values (with above parameters) and adding them to n log-normally distributed random values. However, I wish to know if I can use the convolution method instead. Any help would be greatly appreciated.

**EDIT**

Thank you for these answers. I define a pdf, and try to do the convolution integral, but R complains on the integration step. My pdfs are Log Pearson 3 and are as follows

```
dlp3 <- function(x, a, b, g) {
p1 <- 1/(x*abs(b) * gamma(a))
p2 <- ((log(x)-g)/b)^(a-1)
p3 <- exp(-1* (log(x)-g) / b)
d <- p1 * p2 * p3
return(d)
}
f.m <- function(x) dlp3(x,3.2594,-0.18218,0.53441)
f.s <- function(x) dlp3(x,9.5645,-0.07676,1.184)
f.t <- function(z) integrate(function(x,z) f.s(z-x)*f.m(x),-Inf,Inf,z)$value
f.t <- Vectorize(f.t)
integrate(f.t, lower = 0, upper = 3.6)
```

R complains at the last step since the f.t function is bounded and my integration limits are probably not correct. Any ideas on how to solve this?