# dmvnorm MVN density - RcppArmadillo implementation slower than R package including a bit of Fortran

The solution is now online in the Rcpp Gallery

I re-implemented dmvnorm from the mvtnorm package in RcppArmadillo. I somehow like Armadillo, but I guess it would also work in plain Rcpp. The approach from dmvnorm is based on the mahalanobis distance, so I have a function for that and then the multivariate normal density function.

Let me show you my code:

``````#include <RcppArmadillo.h>
#include <Rcpp.h>

// [[Rcpp::export]]
arma::vec mahalanobis_arma( arma::mat x ,  arma::mat mu, arma::mat sigma ){

int n = x.n_rows;
arma::vec md(n);
for (int i=0; i<n; i++){
arma::mat x_i = x.row(i) - mu;
arma::mat Y = arma::solve( sigma, arma::trans(x_i) );
md(i) = arma::as_scalar(x_i * Y);
}
return md;

}

// [[Rcpp::export]]
arma::vec dmvnorm ( arma::mat x,  arma::mat mean,  arma::mat sigma, bool log){

arma::vec distval = mahalanobis_arma(x,  mean, sigma);

double logdet = sum(arma::log(arma::eig_sym(sigma)));
double log2pi = 1.8378770664093454835606594728112352797227949472755668;
arma::vec logretval = -( (x.n_cols * log2pi + logdet + distval)/2  ) ;

if(log){
return(logretval);

}else {
return(exp(logretval));
}
}
``````

So, and not to my big disappointment:

simulate some data

``````sigma <- matrix(c(4,2,2,3), ncol=2)
x <- rmvnorm(n=5000000, mean=c(1,2), sigma=sigma, method="chol")
``````

and benchmark

``````system.time(mvtnorm::dmvnorm(x,t(1:2),.2+diag(2),F))
user  system elapsed
0.05    0.02    0.06

system.time(dmvnorm(x,t(1:2),.2+diag(2),F))
user  system elapsed
0.12    0.02    0.14
``````

No!!!!!! :-(

[EDIT]

The questions are: 1) Why is the RcppArmadillo implementation slower than a plain R implementation? 2) How do I create an Rcpp/RcppArmadillo implementation that beats the R implementation?

[EDIT 2]

I put in the mahalanobis_arma into the mvtnorm::dmvnorm function and it also slows down.

-
I don't understand what your question is –  David Marx Jul 12 '13 at 14:50
If the bulk of the calculations are going to be performed by the same linear algebra library between the two implementaions, why do you expect to see a significant improvement? –  David Marx Jul 12 '13 at 15:05
This just shows you can write slow code in any language. :) Why not simply call `mvtnorm::dmvnorm` from C++? –  Joshua Ulrich Jul 12 '13 at 15:22
Your question title is misleading. RCppArmadillo is not slower than R; it's slower than R plus Fortran. The Fortran bit happens to be more important than the R bit here. –  Hong Ooi Jul 12 '13 at 15:37
the bottom line of this is that re-coding in lower-level languages generally only helps if the relevant operations are not already dropping through to compiled binary code in the original R functions ... –  Ben Bolker Jul 12 '13 at 15:59

If you want a faster implementation of the mahalanobis distance, you just have to re-write your algorithm and mimic the one used by R. It's pretty straightforward

I modified a little bit your function `mahalanobis_arma` to turn `mu` to a `rowvec`.

Basically I just translated the R code to RcppArmadillo

``````mahalanobis
function (x, center, cov, inverted = FALSE, ...)
{
x <- if (is.vector(x))
matrix(x, ncol = length(x))
else as.matrix(x)
x <- sweep(x, 2, center)
if (!inverted)
cov <- solve(cov, ...)
setNames(rowSums((x %*% cov) * x), rownames(x))
}
<bytecode: 0x6e5b408>
<environment: namespace:stats>
``````

Here it is

``````#include <RcppArmadillo.h>
#include <Rcpp.h>

// [[Rcpp::export]]
arma::vec Mahalanobis(arma::mat x, arma::rowvec center, arma::mat cov){
int n = x.n_rows;
arma::mat x_cen;
x_cen.copy_size(x);
for (int i=0; i < n; i++) {
x_cen.row(i) = x.row(i) - center;
}
return sum((x_cen * cov.i()) % x_cen, 1);
}

// [[Rcpp::export]]
arma::vec mahalanobis_arma( arma::mat x ,  arma::rowvec mu, arma::mat sigma ){

int n = x.n_rows;
arma::vec md(n);
for (int i=0; i<n; i++){
arma::mat x_i = x.row(i) - mu;
arma::mat Y = arma::solve( sigma, arma::trans(x_i) );
md(i) = arma::as_scalar(x_i * Y);
}
return md;

}
``````

Now, let's compare this new armadillo version (`Mahalanobis`), your first version (`mahalanobis_arma`) and the R implementation (`mahalanobis`).

I save this Cpp code as `mahalanobis.cpp`

``````require(RcppArmadillo)
sourceCpp("mahalanobis.cpp")

set.seed(1)
x <- matrix(rnorm(10000 * 10), ncol = 10)
Sx <- cov(x)

all.equal(c(Mahalanobis(x, colMeans(x), Sx))
,mahalanobis(x, colMeans(x), Sx))
## [1] TRUE

all.equal(mahalanobis_arma(x, colMeans(x), Sx)
,Mahalanobis(x, colMeans(x), Sx))
## [1] TRUE

require(rbenchmark)
benchmark(Mahalanobis(x, colMeans(x), Sx),
mahalanobis(x, colMeans(x), Sx),
mahalanobis_arma(x, colMeans(x), Sx),
order = "elapsed")

##                                   test replications elapsed
## 1      Mahalanobis(x, colMeans(x), Sx)          100   0.124
## 2      mahalanobis(x, colMeans(x), Sx)          100   0.741
## 3 mahalanobis_arma(x, colMeans(x), Sx)          100   4.509
##   relative user.self sys.self user.child sys.child
## 1    1.000     0.173    0.077          0         0
## 2    5.976     0.804    0.670          0         0
## 3   36.363     4.386    4.626          0         0
``````

As you can see the new implementation is faster than the R one. I'm pretty sure that we can do better here by using cholesky decomposition to solve the covariance matrix or by using other matrix decomposition.

Finally, we can just plug this `Mahalanobis` function into your `dmvnorm` and test it :

``````require(mvtnorm)
set.seed(1)
sigma <- matrix(c(4, 2, 2, 3), ncol = 2)
x <- rmvnorm(n = 5000000, mean = c(1, 2), sigma = sigma, method = "chol")

all.equal(mvtnorm::dmvnorm(x, t(1:2), .2 + diag(2), FALSE),
c(dmvnorm(x, t(1:2), .2+diag(2), FALSE)))
## [1] TRUE

benchmark(mvtnorm::dmvnorm(x, t(1:2), .2 + diag(2), FALSE),
dmvnorm(x, t(1:2), .2+diag(2), FALSE),
order = "elapsed")

##                                                test replications
## 2          dmvnorm(x, t(1:2), 0.2 + diag(2), FALSE)          100
## 1 mvtnorm::dmvnorm(x, t(1:2), 0.2 + diag(2), FALSE)          100
##   elapsed relative user.self sys.self user.child sys.child
## 2  35.366    1.000    31.117    4.193          0         0
## 1  60.770    1.718    56.666   13.236          0         0
``````

It almost twice as fast now.

-
cool, +1 for this. I'll check it out and then accept it. –  Inferrator Jul 12 '13 at 20:43
Just one more thing: I might have different means. So I have to subtract them in advance, and then run this with mean 0. –  Inferrator Jul 12 '13 at 20:53
@Inferrator You can turn `mu` to `mat` again by making sure that you substract it carefully to `x` (row wise) and the dimension are adequate. –  dickoa Jul 12 '13 at 21:00
Right. Great, thanks much! Simple but smart solution. Wouldn't this be nice for the Rcpp gallery? –  Inferrator Jul 12 '13 at 21:12
I put everything together in a gist and added openMP: gist.github.com/anonymous/5987975 - Just run Sys.setenv("PKG_CXXFLAGS"="-fopenmp") Sys.setenv("PKG_LIBS"="-fopenmp") in R and then use sourceCpp –  Inferrator Jul 12 '13 at 21:24