[R-meta] Differences in calculation of CVR in escalc()
Dear Samuel
Not sure what the issue is but the code from escalc is
if (measure == "CVR") {
yi <- log(sd1i/m1i) + 1/(2 * (n1i - 1)) - log(sd2i/m2i) -
1/(2 * (n2i - 1))
vi <- 1/(2 * (n1i - 1)) + sd1i^2/(n1i * m1i^2) +
1/(2 * (n2i - 1)) + sd2i^2/(n2i * m2i^2)
}
Note you can obtain this by going
library(metafor)
sink("escalc.txt")
escalc.default
sink()
and examining escalc.txt with your favourite text editor
Michael
On 09/10/2017 13:12, Samuel Knapp wrote:
Dear all,
I am conducting a meta-analysis on the stability of crop yields. I now
follow the approach suggeted by Nakagawa et al. (2015) approach and its
implementation in the metafor package, which helps me a lot!
As I first step I compared the estimates of the escalc function for ROM,
VR and CVR to the actual formulas (actually I used the functions in the
supplement of Nakagawa). Fortunately, they all yielded the same
estimates, except for the variance estimate of CVR. I did the
calculations on the gibson example data. The respective code (only for
CVR) is:
data <- get(data(dat.gibson2002))
metadat <- escalc(measure="CVR", m1i=m1i, m2i=m2i, sd1i=sd1i, sd2i=sd2i,
n1i=n1i, n2i=n2i, data=data)
# functions from Nakagawa et al. (2015)
Calc.lnCVR<-function(CMean, CSD, CN, EMean, ESD, EN){
? ES<-log(ESD) - log(EMean) + 1 / (2*(EN - 1)) - (log(CSD) - log(CMean)
+ 1 / (2*(CN - 1)))
? return(ES)
}
Calc.var.lnCVR<-function(CMean, CSD, CN, EMean, ESD, EN, Equal.E.C.Corr=T){
? if(Equal.E.C.Corr==T){
??? mvcorr<-cor.test(log(c(CMean, EMean)), log(c(CSD, ESD)))$estimate
??? S2<- CSD^2 / (CN * (CMean^2)) + 1 / (2 * (CN - 1)) - 2 * mvcorr *
sqrt((CSD^2 / (CN * (CMean^2))) * (1 / (2 * (CN - 1)))) +
???????? ESD^2 / (EN * (EMean^2)) + 1 / (2 * (EN - 1)) - 2 * mvcorr *
sqrt((ESD^2 / (EN * (EMean^2))) * (1 / (2 * (EN - 1))))
? }? else{
??? Cmvcorr<-cor.test(log(CMean), log(CSD))$estimate? # corrected
(missing log()), was "cor.test(log(EMean), (ESD))$estimate"
??? Emvcorr<-cor.test(log(EMean), log(ESD))$estimate
??? S2<- CSD^2 / (CN * (CMean^2)) + 1 / (2 * (CN - 1)) - 2 *Cmvcorr *
sqrt((CSD^2 / (CN * (CMean^2))) * (1 / (2 * (CN - 1)))) +
???????? ESD^2 / (EN * (EMean^2)) + 1 / (2 * (EN - 1)) - 2 *Emvcorr *
sqrt((ESD^2 / (EN * (EMean^2))) * (1 / (2 * (EN - 1))))
? }
? return(S2)
}
# compare
with(data,Calc.lnCVR(m2i,sd2i,n2i,m1i,sd1i,n1i))
metadat$yi # is the same
# with pooled correlation
with(data,Calc.var.lnCVR(m2i,sd2i,n2i,m1i,sd1i,n1i,Equal.E.C.Corr = T))
metadat$vi # NOT THE SAME!!!
# with separate correlations for E and C
with(data,Calc.var.lnCVR(m2i,sd2i,n2i,m1i,sd1i,n1i,Equal.E.C.Corr = F))
metadat$vi # ALSO NOT THE SAME!!!
I checked all the equations in the Nakagawa functions and couldn't find
any error. Also, I tried the pooled and separate correlation.
Unfortunately, I didn't manage to access the code behind the escalc
function in order to check the underlying calculations.
Does anybody have a suggestion, what this difference could be due to?
(Versions: R 3.4.2, metafor 2.0)
Many thanks,
Sam
Reference: Nakagawa et al. , 2015. Meta-analysis of variation:
ecological and evolutionary applications and beyond. Methods Ecol Evol
6, 143?152. doi:10.1111/2041-210X.12309