Weak mixing behavior for the projectivized derivative extension
Dynamical Systems
2024-12-31 v1
Abstract
In both smooth and analytic categories, we construct examples of diffeomorphisms of topological entropy zero with intricate ergodic properties. On any smooth compact connected manifold of dimension 2 admitting a nontrivial circle action, we construct a smooth diffeomorphism whose differential is weakly mixing with respect to a smooth measure in the projectivization of the tangent bundle. In case of the 2-torus, we also obtain the analytic counterpart of such a diffeomorphism. The constructions are based on a quantitative version of the ``Approximation by Conjugation'' method, which involves explicitly defined conjugation maps, partial partitions, and the adaptation of a specific analytic approximation technique.
Cite
@article{arxiv.2412.21041,
title = {Weak mixing behavior for the projectivized derivative extension},
author = {Shilpak Banerjee and Divya Khurana and Philipp Kunde},
journal= {arXiv preprint arXiv:2412.21041},
year = {2024}
}
Comments
43 pages, 2 figures