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Consider the following:

foo = 1:10
bar = 2 * foo
glm(bar ~ foo, family=poisson)

I get results

(Intercept)          foo  
     1.1878       0.1929  

Degrees of Freedom: 9 Total (i.e. Null);  8 Residual
Null Deviance:      33.29 
Residual Deviance: 2.399    AIC: 47.06 

From the explanation on this page, it seems like the coefficient of foo should be log(2), but it's not.

More generally, I thought the output of this is supposed to mean that lambda = 1.187 + .1929 * foo where lambda is the parameter for the Poisson distribution, but that doesn't seem to fit with the data.

How should I interpret the output of this regression?

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closed as off topic by Ben Bolker, user1317221_G, mnel, Sankar Ganesh, Roman C Feb 19 '13 at 9:29

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I think you're confusing differences and ratios. The exponentiated coefficient represents a multiplicative change (in expectation) not an additive one. – joran Feb 17 '13 at 17:20
this isn't a programming question, really -- more of a stats question. You can interpret the output as saying that the best-fit mean relationship is lambda = exp(1.187 + 0.1929*foo) (or if you prefer lambda = exp(1.187)*exp(0.1929*foo) -- exp() is the inverse-link function in this case. – Ben Bolker Feb 17 '13 at 17:21
up vote 4 down vote accepted

Poisson models are multiplicative. What this is saying is that as a result of some sort of averaging process that an increase of 1 in the order (increments in the foo predictor), will be associated with ratio of adjacent even integers in the range seq( 2, 20, by 2) that is exp(0.1929). I don't think the prediction is very good but when you look at the possible values, not bad.

> exp(0.1929)
[1] 1.212762

> seq(4,20,by=2)/seq(2,18,by=2) 
[1] 2.000000 1.500000 1.333333 1.250000 1.200000 1.166667 1.142857 1.125000 1.111111 
> mean( (2:11)/(1:10) )
[1] 1.292897
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