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Looking at the plyr tutorial, I find the following preparation :

b2 <- ddply(baseball, "id", transform, cyear = year - min(year) + 1)  
b2 <- ddply(b2, "id", transform, career = (cyear - 1) / max(cyear)) 
bruth <- subset(b2, id == "ruthba01")
# Could we model that as two straight lines?
bruth$p <- (bruth$career - 0.5) * 100

now some model

mod <- lm(g ~ p + p:I(p > 0), data = bruth)

what is the difference with ?

mod <- lm(g ~ p + I(p > 0), data = bruth)

when I check


in both cases it yields the same columns with the same numbers.
yet the regression coefficients are entirely different...

any idea of what this notation means ?

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check model.matrix(mod) for both models and you will find the difference. –  Ramnath Jul 10 '11 at 12:44
good trick. thank you very much –  nicolas Jul 10 '11 at 12:49
@nicolas or @Ramnath could go ahead and post the answer (different parameterization) as a real answer ... I posted a similar response recently on the r-sig-mixed-models list: article.gmane.org/gmane.comp.lang.r.lme4.devel/6351 –  Ben Bolker Jul 10 '11 at 13:22

1 Answer 1

Run the following code to see the impact of the different models:

 with(bruth, plot(p, predict(mod), type="l" )  )
 with(bruth, points(p, g,  col="red") )
 with(bruth, lines(p, predict(mod2), lty=3, lwd=2, col="red") )
 title(main="Different uses of I() and interaction")

It highlights the impact of the choice of (arbitrary?) joinpoints on the output of segmented regression.

enter image description here

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