Hi @Thierry_S,

There are perhaps some options interesting to consider for your use case :

• Partial contribution of variables : In the red triangle of the PCA platform, you can select "Partial Contribution of Variables", which offers an interesting view on which variables are the most influent in which principal components, and the table provided before the plot is helpful to estimate these relative influences :
  

   

• Cluster Variables : Helps define non-overlapping clusters of variables and may help you select the most interesting/important contributing variables to the different clusters.
• Scree plot : Finally, if you want to estimate an appropriate number of principal components to use (good compromise between accuracy/variability explanation and complexity/number of PCs), the Scree plot is a very nice option, showing the eigenvalues depending on the principal components order : 
  

  Common approach in litterature recommends selecting only a number of PCs which provide eigenvalue >1 and not beyond the "elbow" region (as for each additional factor, the eigenvalue doesn't change a lot, meaning the contribution of each additional variable is not very high).

  "Those with eigenvalues less than 1.0 are not considered to be stable. They account for less variability than does a single variable and are not retained in the analysis. In this sense, you end up with fewer factors than original number of variables. (Girden, 2001)" : https://stats.stackexchange.com/questions/72439/why-eigenvalues-are-greater-than-1-in-factor-analysi... 

I hope these first options will help you,

Best,