The shub conjecture on topological entropy $h(f)$ of self map f on manifold M says that the topological entropy is greater (or equal) than (to) thelog of maximum absolute values of the eigenvalues of the linear map f* induced on Homologies.
Are there some Polynomial entropy version of this conjecture on compact topological manifolds or even topological space?
The polynomial entropy is described here
https://link.springer.com/article/10.1134/S156035472304007X
I asked the question in Physicsoverflow and in a comment form in RG too.