I have written a function that computes the Kullback-Leibler divergence from N(mu2, sigma2) to N(0, 1).

```
mu1 <- 0
sigma1 <- 1
f <- function(mu2, sigma2)
{
g <- function(x)
{
(dnorm(x, mean=mu1, sd=sigma1, log=TRUE) -
dnorm(x, mean=mu2, sd=sigma2, log=TRUE)) *
dnorm(x, mean=mu1, sd=sigma1)
}
return(integrate(g, -Inf, Inf)$value)
}
```

For example, the KL divergence from N(5, 1) to N(0, 1) is

```
> f(5, 1)
[1] 12.5
```

I am sure that this result is correct because I computed at hand a closed form expression that gives the KL divergence from N(mu2, sigma2) to N(mu1, sigma1).

My question is about the **KLdiv** function from the flexmix package. Why doesn't it yield the same result ? What does it actually compute ?

```
> library(flexmix)
> x <- seq(-4, 12, length=200)
> y <- cbind(norm1=dnorm(x, mean=0, sd=1), norm2=dnorm(x, mean=5, sd=1))
> KLdiv(cbind(y))
norm1 norm2
norm1 0.000000 7.438505
norm2 7.438375 0.000000
```

Instead of using KLdiv, what do you think of the following procedure :

```
> x <- rnorm(1000)
> dist <- mean(dnorm(x, mean=0, sd=1, log=TRUE)) -
+ mean(dnorm(x, mean=5, sd=1, log=TRUE))
> print(dist)
[1] 12.40528
```

???

Thank you in advance !

`KLdiv`

function? – Joshua Ulrich Feb 1 '11 at 16:07`KLdiv`

is an S4 generic, but the message tells you to "Use showMethods("KLdiv") for currently available [methods]." A cursory look at`?showMethods`

indicates you can use`showMethods("KLdiv", classes="matrix", includeDefs=TRUE)`

to see the source. – Joshua Ulrich Feb 1 '11 at 16:28`KLdiv()`

is interpreted to contain two probabilities of the same class. This is probably not what you intended to simulate. – caracal Feb 1 '11 at 17:52