I have to assess the MTTF of electrical devices in presence of radiation, for different test conditions (voltage).

For each voltage, I can only test few units (typically 5), the number of units failing ranges from 0 (at low voltages) to possibly 5 (at high voltages).

Therefore, it is a case of survival analysis with possibly very high "right" censoring (for example, at the end of irradiation, only one unit may have failed and the other 4 ones will be OK). I'm not a statistician, so I'd like to ask for advice.

I'm using R and the "survival" package to handle the data. According to what I've understood, R computes the Kaplan-Meier estimator and tries to fit the resulting empirical distribution to a Weibull failure model (I'm using survreg with dist="weibull", which is the failure model of such devices)

My problem:

I can compute a MTTF (I use the mean of the Weibull distribution with the parameters resulting from the Weibull fit), but I'm a bit lost to get the 95% confidence interval of the MTTF.

The vcov() function applied to the return of survreg(...) provides variance and covariance on the Weibull parameters, but I think there is an additional uncertainty due to the Kaplan-Meier estimator (see: Greenwood's formula) that is not integrated to the whole thing.

I do not know how to put all the pieces together; are there facilities in R (in the survival package or elsewhere) to achieve this? Or could you please provide guidelines on how to integrate all error sources?

`tolerance::exttol.int`

? – Carl Witthoft Feb 13 '14 at 14:41