## How the LogLikelihood Ratio Criterion Works

### Weibull Topics

I'm actively working on the Weibull pages.  Please visit again soon.

### Likelihood is "the probability of the data."

It is proportional to the probability that the experiment turned out the way it did.

So some Weibull model parameters are more likely than others because they explain the observed failures better than other values.   We choose the "best" parameter values, i.e. those that maximize the likelihood, which are called, not surprisingly, "maximum likelihood parameter estimates."

The most likely parameter values, given the data, for the Weibull slope, , and location, , are the "+" in Figure 1, but other values are also plausible, although less likely.  That (, ) pair produces the best fit of the data, shown as the black line in Figure 2.

The example below is for a complete dataset, with no censoring.  Notice that (after transformation) the confidence "ellipse" is nearly elliptical.  Notice, too, that it is not a true ellipse because it is not symmetric along its major and minor axes.  That is why we choose not to use methods that employ an ellipse to approximate the loglikeihood surface (like inverting the Fisher Information Matrix) and use the true loglikelihood instead.

Each point along the 95% confidence contour of the loglikelihood surface (Figure 1) produces a Weibull line (Figure 2).

The most likely parameter values, given the data, for the Weibull slope, , and location, ,  are the "+" but other values are also plausible, although less likely.  That (, ) pair produces the best fit of the data, shown as the black line in Figure 2.