Dear all Hi,

I would like to know if I can apply anova to my log2 transformed data.

We have SNV + INDEL mutation count data for ICGC data and we trying to prove in specific regions Breast Cancer have higher rate of mutations. But because the total number of mutations in data is too dispersed we apply log2 transformation. Therefore I would like to know if is it okay to apply anova in this case because all the mean and variance calculations are different in log2 scale.

My aim is to prove the means are not same across cancers then post hoc test to perform individual comparisons with t.test.

Best regards,

Tunc.

ANOVA investigates the relationship between sample group vs within sample group variance, which roughly translates to the difference in means between the sample groups and assumed additive noise within your sample group. However, if you log your data your error model become different. At that point, you are (again roughly) investigating the relationship of assumed multiplicative noise to the difference in geometric means between your sample groups. I do not know if it is or is not reasonable to assume that SNV + INDEL mutation count data is best modeled by multiplicative or additive noise. However, you can easily find out by plotting the in-group variance as a function of the mean intensity of the sample group. If there is a linear correlation between the two entities I would say that the error is multiplicative. If the variance is invariant of intensity it is additive.

If you are concerned about the underlying parametric assumptions, you could try Kruskal-Wallis, the non-parametric version of the ANOVA. It's rank-based, meaning you can apply it to the non-transformed data.