I’m trying to run a cca() using the package yacca on a data set of different measurements of feeding behavior against four different treatment.

My hope was to use the canonical correlation value as a summary of all the behaviors for each treatment so that I can then use to as one of my inputs as in -omic scale analysis. However, whatever I seem to do with my data I seem to be getting the same one of two errors .

**Data structure:**

x= 62 columns with 605 data samples, each a different measurement of behavior (including count and duration data (though same errors arise using duration data only)

y= 1 column for each of the 605 samples labelled either as a number s 1,2,3 or 4 as characters L, Y, M or T (I’ve tried both)

**code:**

dat.impute<-as.data.frame(read.csv("data.imputed.csv"),header=TRUE)

library(yacca)

x<-as.matrix(dat.impute[,2:63])

y<-as.matrix(dat.impute[,1])

res.cc<-cca(x,y)

**Error messages:**

*If y= character*

res.cc<-cca(x,y)

Error in colMeans(x, na.rm = TRUE) : 'x' must be numeric

*If y= numeric*

res.cc<-cca(x,y)

Error in qr.solve(cxx, cxy) : singular matrix 'a' in solve

```
#(I seriously haven’t a clue what this means!)
```

*This give the X matrix the following structure*

str(x)

num [1:605, 1:62] 152.2 152.2 647.6 17.9 52.7 ...

attr(*, "dimnames")=List of 2

..$ : NULL

..$ : chr [1:62] "Time.to.1st.probe.from.start.of.EPG" "Number.of.probes.to.the.1st.E1" "Number.of.F" "Duration.of.1st.probe" ...

is.numeric(x) [1] TRUE

is.factor(x) [1] FALSE

class(x) [1] "matrix"

mode(x) [1] "numeric"

Among the obvious things I have tried I've: altering the format in r of x and y in every way I know of (as.value()/as.number()...), changing the structure of the data in the original file, changing how I load my data (as.csv/as.table...) . In a desperate attempt I even tried to transpose the data leading to "Error in cov(y, use = use) : no complete element pairs".

In summary hopelessly I keep producing the same error message so any advice would be most welcome. This even if it is telling me I have the wrong end of the stick with what I’m trying to achieve with this model.

Many thanks

David Hopkins

Boa07dph@sheffield.ac.uk