Generalized $k$-contact structures

U. N. Matos de Almeida

Published 2019-10-29Version 1

With the goal to study and better understand algebraic Anosov actions of $\mathbb R^k$, we develop a higher codimensional analogue of the contact distribution on odd dimensional manifolds, call such structure a generalized $k$-contact structure. We show that there exist an $\mathbb R^k$-action associated with this structure, afterwards, we relate this structure with the Weyl chamber actions and a few more general algebraic Anosov actions, proving that such actions admits a compatible generalized $k$-contact structure.