# Manual Maximum-Likelihood Estimation of an AR-Model in R

I am trying to estimate a simple AR(1) model in R of the form y[t] = alpha + beta * y[t-1] + u[t] with u[t] being normally distributed with mean zero and standard deviation sigma.

I have simulated an AR(1) model with alpha = 10 and beta = 0.1:

``````library(stats)
data<-arima.sim(n=1000,list(ar=0.1),mean=10)
``````

First check: OLS yields the following results:

``````lm(data~c(NA,data[1:length(data)-1]))

Call:
lm(formula = data ~ c(NA, data[1:length(data) - 1]))

Coefficients:
(Intercept)  c(NA, data[1:length(data) - 1])
10.02253                          0.09669
``````

But my goal is to estimate the coefficients with ML. My negative log-likelihood function is:

``````logl<-function(sigma,alpha,beta){
-sum(log((1/(sqrt(2*pi)*sigma)) * exp(-((data-alpha-beta*c(NA,data[1:length(data)-1]))^2)/(2*sigma^2))))
}
``````

that is, the sum of all log-single observation normal distributions, that are transformed by u[t] = y[t] - alpha - beta*y[t-1]. The lag has been created (just like in the OLS estimation above) by c(NA,data[1:length(data)-1]).

When I try to put it at work I get the following error:

``````library(stats4)
mle(logl,start=list(sigma=1,alpha=5,beta=0.05),method="L-BFGS-B")
Error in optim(start, f, method = method, hessian = TRUE, ...) :
L-BFGS-B needs finite values of 'fn'
``````

My log-likelihood function must be correct, when I try to estimate a linear model of the form y[t] = alpha + beta * x[t] + u[t] it works perfectly.

I just do not see how my initial values lead to a non-finite result? Trying any other initial values does not solve the problem.

Any help is highly appreciated!

-
I find it annoying when seeing code that obviously uses functions from non-standard packages is posted without including the `library` calls that would identify and load the function. (I also don't see recognition in your code of the fact that lagged variables have NA's.) –  BondedDust Sep 8 '13 at 16:03
@DWin , I think it's just `stats4::mle`, so `library(stats4)` should do it. At least this is a base package ... –  Ben Bolker Sep 8 '13 at 17:26
When I did ?mle I got a "No documentation for ‘mle’" message. So maybe it's like `grid` and not routinely loaded despite being recommended. –  BondedDust Sep 8 '13 at 18:00
Yes, you do need `library(stats4)`. I haven't looked carefully, but I strongly suspect that the primary issue is the `NA` values in the lagged variables -- this would make the ML `NA`. Rule #1: always check by evaluating your log-likelihood function at any proposed initial values to make sure the results make sense! –  Ben Bolker Sep 8 '13 at 18:27
Sorry that I did not include all the "library" commands and the data. Now everything is there :) I also do believe that the error must come from the fact that there is a NA value in the data, even though to me it is strange to receive "this" message. Does anyone please know how I overcome the problem with the first value being NA? How do I tell R to start with the second observation? Thank you. –  Chris437 Sep 8 '13 at 19:36

This works for me -- basically what you've done but leaving out the first element of the response, since we can't predict it with an AR model anyway.

Simulate:

``````library(stats)
set.seed(101)
data <- arima.sim(n=1000,list(ar=0.1),mean=10)
``````

Negative log-likelihood:

``````logl <- function(sigma,alpha,beta) {
-sum(dnorm(data[-1],alpha+beta*data[1:length(data)-1],sigma,log=TRUE))
}
``````

Fit:

``````library(stats4)
mle(logl,start=list(sigma=1,alpha=5,beta=0.05),method="L-BFGS-B")
## Call:
## mle(minuslogl = logl, start = list(sigma = 1, alpha = 5, beta = 0.05),
##     method = "L-BFGS-B")
##
## Coefficients:
##  0.96150573 10.02658632  0.09437847
``````

Alternatively:

``````df <- data.frame(y=data[-1],ylag1=head(data,-1))
library(bbmle)
mle2(y~dnorm(alpha+beta*ylag1,sigma),
start=list(sigma=1,alpha=5,beta=0.05),
data=df,method="L-BFGS-B")
``````
-
Smooth solution! Thank you for your time! –  Chris437 Sep 9 '13 at 14:00