So I am using survreg, and I expect my predicted results to obey a lower bound of 0, but they indicate negative results frequently. I think it is somehow estimating a linear result instead of the survival model I'm trying to create. Here's what I've done:

```
linear.first.stage<-lm(y ~ x, data=clip)
```

First I estimated some points to speed up my estimation process. It fails to converge without this first stage. I create a survival object, following the code from ?survreg that provides an explicit example of a tobit regression. I duplicated this below for x and y. In my data set, y can only be observed at a non-negative value, but if it is positive, it tends to be distributed normally around 200 or so with sd of about 20. X may take any value and isn't theoretically bound by any particular number that immediately comes to mind.

```
surv_y<-Surv(clip$y, clip$y>0,type="left")
first.stage<-survreg(surv_y ~ x,init=(linear.first.stage), dist="gaussian", data=clip)
```

I run the survival regression, which should be equivalent to a Tobit. To confirm that my interpretation of events were the same, I ran the following:

```
test<-tobit(y~x, left=0, right=Inf, dist="gaussian", data=clip)
p_test<-predict(test)
p<-predict(first.stage)
plot(p_test-p)
```

The plot shows a flat line at zero, so upon visual inspection these commands are identical, as they should be. However, in both cases, results under 0 are predicted. This is problematic because I have stated that the leftward bound of observable information is 0. My expectations is that all predicted values must be >0.

I have tried predicting using types "link", "response", "linear", but to no avail. I assume the predict command is producing the outcomes *as if the censorship was not occurring*. How do I produce the prediction that obeys the lower bound of 0?

References:

`Surv`

object? The`event`

is defined by`clip$y >0`

. So why wouldn't force some of the predictions to be negative? (I don't really understand how this construction makes sense, either. Defining the event on the basis of the time of observation just seems wrong. Generally one needs to that the survival and censoring process to be more independent than this.) – 42- Apr 7 '13 at 20:39