7

I am trying to use the command mle2, in the package bbmle. I am looking at p2 of "Maximum likelihood estimation and analysis with the bbmle package" by Bolker. Somehow I fail to enter the right start values. Here's the reproducible code:

l.lik.probit <-function(par, ivs, dv){
Y <- as.matrix(dv)
X <- as.matrix(ivs)
K <-ncol(X)
b <- as.matrix(par[1:K])
phi <- pnorm(X %*% b) 
sum(Y * log(phi) + (1 - Y) * log(1 - phi)) 
}

n=200

set.seed(1000)

x1 <- rnorm(n)
x2 <- rnorm(n)
x3 <- rnorm(n) 
x4 <- rnorm(n) 

latentz<- 1 + 2.0 * x1 + 3.0 * x2 + 5.0 * x3 + 8.0 * x4 + rnorm(n,0,5)

y <- latentz 
y[latentz < 1] <- 0 
y[latentz >=1] <- 1 
x <- cbind(1,x1,x2,x3,x4)
values.start <-c(1,1,1,1,1)   

foo2<-mle2(l.lik.probit, start=list(dv=0,ivs=values.start),method="BFGS",optimizer="optim", data=list(Y=y,X=x)) 

And this is the error I get:

Error in mle2(l.lik.probit, start = list(Y = 0, X = values.start), method = "BFGS",  : 
  some named arguments in 'start' are not arguments to the specified log-likelihood function

Any idea why? Thanks for your help!

6
  • 1
    values.start is not specified. You have to define it. There is also a typo in foo2<<-.
    – user1378672
    May 15, 2012 at 13:12
  • Thanks for the quick answer! I made those changes (my starting values being values.start <-c(1,1,1,1,1) ), but I still get the same error message. I believe there is some incongruity between the mle2 command and the function I specified, but I cannot figure it out for the life of me!
    – EOM
    May 15, 2012 at 14:11
  • 1
    Are you implementing a probit regression?
    – user1378672
    May 15, 2012 at 14:33
  • I am doing a heteroskedastic probit, the formula is almost the same, so I am reproducing here the simple probit, which gives me the exact same problem, the starting values seem to be misspecified...but why?
    – EOM
    May 15, 2012 at 15:39
  • The formulation of l.lik.probit is strange, because it assigns external values x and y to its arguments X and Y. Also, the call to mle2 uses named parameters "X" and "Y" twice each in two conflicting ways. I therefore suspect you may be reading an error message resulting from a long cascade of errors and it might not reflect all the things going wrong. Maybe you should first try the examples on the mle2 manual page and then gradually modify them to fit your circumstances.
    – whuber
    May 15, 2012 at 21:19

1 Answer 1

6

You've missed a couple of things, but the most important is that by default mle2 takes a list of parameters; you can make it take a parameter vector instead, but you have to work a little bit harder.

I have tweaked the code slightly in places. (I changed the log-likelihood function to a negative log-likelihood function, without which this would never work!)

l.lik.probit <-function(par, ivs, dv){
    K <- ncol(ivs)
    b <- as.matrix(par[1:K]) 
    phi <- pnorm(ivs %*% b)
    -sum(dv * log(phi) + (1 - dv) * log(1 - phi)) 
}

n <- 200

set.seed(1000)

dat <- data.frame(x1=rnorm(n),
                  x2=rnorm(n),
                  x3=rnorm(n),
                  x4=rnorm(n))

beta <- c(1,2,3,5,8)
mm <- model.matrix(~x1+x2+x3+x4,data=dat)
latentz<- rnorm(n,mean=mm%*%beta,sd=5)

y <- latentz 
y[latentz < 1] <- 0 
y[latentz >=1] <- 1
x <- mm
values.start <- rep(1,5)

Now we do the fit. The main thing is to specify vecpar=TRUE and to use parnames to let mle2 know the names of the elements in the parameter vector ...

library("bbmle")
names(values.start) <- parnames(l.lik.probit) <- paste0("b",0:4)
m1 <- mle2(l.lik.probit, start=values.start,
           vecpar=TRUE,
           method="BFGS",optimizer="optim",
           data=list(dv=y,ivs=x))

As pointed out above for this particular example you have just re-implemented the probit regression (although I understand that you now want to extend this to allow for heteroscedasticity in some way ...)

dat2 <- data.frame(dat,y)
m2 <- glm(y~x1+x2+x3+x4,family=binomial(link="probit"),
    data=dat2)

As a final note, I would say that you should check out the parameters argument, which allows you to specify a sub-linear model for any one of the parameters, and the formula interface:

m3 <- mle2(y~dbinom(prob=pnorm(eta),size=1),
           parameters=list(eta~x1+x2+x3+x4),
           start=list(eta=0),
           data=dat2)

PS confint(foo2) appears to work fine (giving profile CIs as requested) with this set-up.

ae <- function(x,y) all.equal(unname(coef(x)),unname(coef(y)),tol=5e-5)
ae(m1,m2) && ae(m2,m3)

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