Leonid,
I do not experience "random stops at arbitrary point with arbitrary
error" so I don't understand what your problem is.
The objective function is the primary metric of goodness of fit. I agree
it is possible to get drops in objective function that are associated
with unreasonable parameter estimates (typically an OMEGA estimate). But
I look at the parameter estimates after each run so that I can detect
this kind of problem. Part of the display of the parameter estimates is
the correlation of random effects if I am using OMEGA BLOCK. This is
also a weaker secondary tool. By exploring different models I can get a
feel for which parts of the model are informative and which are not by
looking at the change in OBJ. Small (5-10) changes in OBJ are not of
much interest. A change of OBJ of at least 50 is usually needed to
detect anything of practical importance.
I don't understand what you find of interest in the correlation of
bootstrap parameter estimates. This is really nothing more than you
would get from looking at the correlation matrix of the estimate from
the covariance step. High estimation correlations point to poor
estimability of the parameters but I think they are not very helpful for
pointing to ways to improve the model.
Nevertheless I can agree to disagree on our modelling art :-)
Nick
Leonid Gibiansky wrote:
Nick,
I think it is dangerous to rely heavily on the objective function (let
alone on ONLY objective function) in the model development process. I
am very surprised that you use it as the main diagnostic. If you think
that nonmem randomly stops at arbitrary point with arbitrary error,
how can you rely on the result of this random process as the main
guide in the model development? I pay attention to the OF but only as
one of the large toolbox of other diagnostics (most of them graphics).
I routinely see examples when over-parametrized unstable models
provide better objective function values, but this is not a sufficient
reason to select those. If you reject them in favor of simpler and
more stable models, you would see less random stops and more models
with convergence and successful covariance steps.
Even with bootstrap, I see the main real output of this procedure in
revealing the correlation of the parameter estimates rather then in
computation of CI. CI are less informative, while visualization of
correlations may suggest ways to improve the model.
Any way, it looks like there are at least the same number of modeling
methods as modelers: fortunately for all of us, this is still art, not
science; therefore, the time when everything will be done by the
computers is not too close.
Leonid
--------------------------------------
Leonid Gibiansky, Ph.D.
President, QuantPharm LLC
web: www.quantpharm.com
e-mail: LGibiansky at quantpharm.com
tel: (301) 767 5566
Nick Holford wrote:
Mats, Leonid,
Thanks for your definitions. I think I prefer that provided by Mats
but he doesn't say what his test for goodness-of-fit might be.
Leonid already assumes that convergence/covariance are diagnostic so
it doesnt help at all with an independent definition of
overparameterization. Correlation of random effects is often a very
important part of a model -- especially for future predictions -- so
I dont see that as a useful test -- unless you restrict it to
pathological values eg. |correlation|>0.9?. Even with very high
correlations I sometimes leave them in the model because setting the
covariance to zero often makes quite a big worsening of the OBJ.
My own view is that "overparameterization" is not a black and white
entity. Parameters can be estimated with decreasing degrees of
confidence depending on many things such as the design and the
adequacy of the model. Parameter confidence intervals (preferably by
bootstrap) are the way i would evaluate how well parameters are
estimated. I usually rely on OBJ changes alone during model
development with a VPC and boostrap confidence interval when I seem
to have extracted all I can from the data. The VPC and CIs may well
prompt further model development and the cycle continues.
Nick
Leonid Gibiansky wrote:
Hi Nick,
I am not sure how you build the models but I am using convergence,
relative standard errors, correlation matrix of parameter estimates
(reported by the covariance step), and correlation of random effects
quite extensively when I decide whether I need extra compartments,
extra random effects, nonlinearity in the model, etc. For me they
are very useful as diagnostic of over-parameterization. This is the
direct evidence (proof?) that they are useful :)
For new modelers who are just starting to learn how to do it, or
have limited experience, or have problems on the way, I would advise
to pay careful attention to these issues since they often help me to
detect problems. You seem to disagree with me; that is fine, I am
not trying to impose on you or anybody else my way of doing the
analysis. This is just an advise: you (and others) are free to use
it or ignore it :)
Thanks
Leonid
Mats Karlsson wrote:
<<I would say that if you can remove parameters/model components
without
detriment to goodness-of-fit then the model is overparameterized. >>
--
Nick Holford, Professor Clinical Pharmacology
Dept Pharmacology & Clinical Pharmacology
University of Auckland, 85 Park Rd, Private Bag 92019, Auckland, New Zealand
n.holf...@auckland.ac.nz tel:+64(9)923-6730 fax:+64(9)373-7090
mobile: +64 21 46 23 53
http://www.fmhs.auckland.ac.nz/sms/pharmacology/holford
