Interesting; I left the OP a comment pointing out they should accept/upvote the answer and that it's rude to delete a question after receiving a valid answer, but that already got deleted.
So, if I have a 3D matrix and I want the mean of every 4 columns together (of the first dim), I need to create a 4D matrix, right? My head is not reshape-friendly today
@AnderBiguri would be my preference :P I don't even know where to begin to collect 4 2D matrices (all rows/pages of a single column), then stack those along the 4th dimension. Sounds difficult :P Every fourth column, i.e. 1:4:end; 2:4:end etc would be easier to index
Luis' choice seems weird indeed. Bla's choice makes sense from a mathematical point of view, but just like we have our own "is floating point math broken" target, I prefer a MATLAB solution
Bla duped to a question asking about the normal logarithm (plus in a different language). It wasn't immediately clear to me that the normal logarithm property also holds for matrix logarithm, which is why I did that experiment, and why I thought it was worth a separate answer.
OK, I found a dupe. I don't like that answer as much as I like mine, of course, but it does give the recipe.
Actually that dupe gives some limitations regarding the definition of matrix logarithm that I hadn't considered. It's a pretty good answer.
I'm implementing a custom layer in Keras which is basically an extention of global max pooling.. But, instead of taking the max value of a feature map, I need to split the feature map into segments and take the max value of each segment. So, assume I have a matrix (n, 18, 200) dimension. This corresponds to (batch_size, steps, maps). For each map, I need to split the steps axis into two chunks. c1[0:i]; c2[i:end]
@CrisLuengo I did mean that as a dupe. I interpreted the OP wants matrix log, not element-wise log. But maybe I got it wrong. Feel free to change link or un-dupe