Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

my problem is that I have calculated Spearman rank correlations between two variables. One reviewer asked me if I could add also test statistics for all coefficients where p < 0.001.

Here is one result:

> cor.test(pl$data, pl$rang, method= "spearman")


#       Spearman's rank correlation rho

data:  pl$data and pl$rang
S = 911164.6, p-value = 1.513e-05
alternative hypothesis: true rho is not equal to 0 
sample estimates:
rho 
-0.3347658 

Is the test statistics equal to S = 911164.6? Is it OK that it is so big number? Sorry in advance if the question is not very professional but I spend quite some time searching for the answers in the books and on internet. :( Thank you for the help in advance.

share|improve this question
    
presumably it is the sum of squared rank differences (see the Wikipedia entry on Spearman rank correlation); its magnitude signifies just that you have a big data set, I think ... –  Ben Bolker Mar 14 '13 at 12:50
    
so if someone ask from me to write also test statistics I could write S = 911164.6 and rho= -0,335? –  MtS Mar 14 '13 at 16:11
1  
yes ............ –  Ben Bolker Mar 14 '13 at 16:40
    
Thank you Ben ... –  MtS Mar 14 '13 at 16:56
1  
@MtS I flagged your question to be migrated to stats.stackexchange.com but it was declined. You might want to go to that site yourself and ask them about your large S value, though BenBolker and RichieCotton have basically answered the question. –  Ben Mar 22 '13 at 23:08

1 Answer 1

up vote 3 down vote accepted

Yes. The ?cor.test help page (in the Value section) describes the return value from cor.test as:

 A list with class ‘"htest"’ containing the following components:  

statistic: the value of the test statistic.

Adapting the example on that page, we see

x <- c(44.4, 45.9, 41.9, 53.3, 44.7, 44.1, 50.7, 45.2, 60.1)
y <- c( 2.6,  3.1,  2.5,  5.0,  3.6,  4.0,  5.2,  2.8,  3.8)
(result <- cor.test(x, y, method = "spearman"))
#         Spearman's rank correlation rho

# data:  x and y 
# S = 48, p-value = 0.0968
# alternative hypothesis: true rho is not equal to 0 
# sample estimates:
# rho 
# 0.6 
result$statistic
#  S 
# 48 

The statistic is given by (n ^ 3 - n) * (1 - r) / 6 where n is the length of x and r <- cor(rank(x), rank(y)).

share|improve this answer
    
Thanks you for this quick answer. So it is OK that my S is 911164? What could be the reason for so high number? –  MtS Mar 14 '13 at 11:30
    
@MtS That specific statistics question might be better suited to stats.stackexchange.com rather than here, which is focused on coding. –  Ben Mar 14 '13 at 14:35
    
Ben is it possible to copy the question to this other side? –  MtS Mar 14 '13 at 16:12
2  
@MtS: Read my updated answer. S is large because you have a lot of data, and S is proportional to the length of the input vectors cubed. –  Richie Cotton Mar 14 '13 at 16:25
    
in wikipedia I found that it is possible to test the significance with: rho*sqrt((n-2)/1-rho^2) or 0.6*sqrt((9-2)/1-0.6^2) = 1.546. This is not the test statistic? :( –  MtS Mar 14 '13 at 16:42

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.