We propose a systematic elementary approach based on trajectories to prove Poincar\'e inequalities for hypoelliptic equations with an arbitrary number of H\"ormander commutators, both in the local and in the non-local case. Our method generalises and simplifies the method introduced in Guerand-Mouhot (2022) in the local case with one commutator, and extended in Loher (2024) to the non-local case with one commutator. It draws inspiration from the paper Niebel-Zacher (2022), although we use different trajectories. We deduce Harnack inequalities and H\"older regularity along the line of the De Giorgi method. Our results recover those in Anceschi-Rebucci (2022) in the local case, and are new in the non-local case.
Comment: 22 pages, 4 figures. Simplified the Lemma on the determinant of the Wronskian matrix in the construction of the trajectories (Lemma 7), and introduced the notion of solutions we work with