[R] what is the difference between survival analysis and (...)

Lucke, Joseph F Joseph.F.Lucke at uth.tmc.edu
Wed Mar 28 18:10:16 CEST 2007


You can (and I have) fit survival data with logistic regression. Agresti (1990, pp 189--196) has an introductory discussion. 

The issue is whether the occurrence of the event is of interest or whether the time-to-event is of interest. If the study lasts 180 days (as in my case) logistic regression treats an event at 1 day the same as an event at 179 days. Similarly, non-occurrence censored at 5 days is treated the same as non-occurrence censored at 180 days. These assumptions only make sense if the hazard rate is constant and (therefore) the time-to-failure distribution is exponential.

One can include exposure time as a offset (non-estimated covariate) to handle non-constant hazard rates. One can also model the hazard rate directly as a log-linear model.

Based on what he said (number events/sample size, using cumulative times), the hostile medical epidemiologist was implicitly assuming the survival time followed an exponential distribution. This assumption is often incorrect.   His arrogance was exceeded only by his ignorance.

Joe

@BOOK{Agresti1990,
  author = {Agresti, Alan},
  title = {Categorical data analysis},
  year = {1990},
  publisher = {John Wiley \& Sons},
  address = {New York, NY},
  series = {Wiley Series in Probability and Mathematical Statistics},
  keywords = {loglinear; logistic}
}


 

-----Original Message-----
From: r-help-bounces at stat.math.ethz.ch [mailto:r-help-bounces at stat.math.ethz.ch] On Behalf Of Eric Elguero
Sent: Wednesday, March 28, 2007 8:40 AM
To: R-help at stat.math.ethz.ch
Subject: Re: [R] what is the difference between survival analysis and (...)

Hi everybody,

recently I had to teach a course on Cox model, of which I am not a specialist, to an audience of medical epidemiologists.
Not a good idea you might say.. anyway, someone in the audience was very hostile. At some point, he sayed that Cox model was useless, since all you have to do is count who dies and who survives, divide by the sample sizes and compute a relative risk, and if there was significant censoring, use cumulated follow-up instead of sample sizes and that's it!
I began arguing that in Cox model you could introduce several variables, interactions, etc, then I remembered of logistic models ;-) The only (and poor) argument I could think of was that if mr Cox took pains to devise his model, there should be some reason...

but the story doesn't end here. When I came back to my office, I tried these two methods on a couple of data sets, and true, crude RRs are very close to those coming from Cox model.

hence this question: could someone provide me with a dataset (preferably real) where there is a striking difference between estimated RRs and/or between P-values? and of course I am interested in theoretical arguments and references.

sorry that this question has nothing to do with R and thank you in advance for your leniency.

Eric Elguero
GEMI-UMR 2724 IRD-CNRS,
Équipe "Évolution des Systèmes Symbiotiques"
911 avenue Agropolis, BP 64501,
34394 Montpellier cedex 5 FRANCE

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