Stability properties of divergence-free vector fields

Eventual shadowing for chain transitive sets of $C^1$ generic dynamical systems ⋮ Orbital shadowing property for generic divergence-free vector fields ⋮ Vector fields satisfying the barycenter property ⋮ Divergence-free vector fields with orbital shadowing ⋮ Divergence-free vector fields with inverse shadowing ⋮ Vector fields with the asymptotic orbital pseudo-orbit tracing property ⋮ Kinematic N-expansive continuous dynamical systems ⋮ Divergence-free vector fields with average and asymptotic average shadowing property ⋮ \(\mathscr{M}\)-shadowing and transitivity for flows ⋮ Asymptotic measure expansive flows ⋮ Flows with ergodic pseudo orbit tracing property ⋮ The specification property for flows from the robust and generic viewpoint ⋮ Hyperbolicity and types of shadowing for \(C^1\) generic vector fields ⋮ Stable weakly shadowable volume-preserving systems are volume-hyperbolic ⋮ Continuum-wise expansiveness for non-conservative or conservative systems ⋮ Measure expansivity for \(C^1\)-conservative systems ⋮ On interrelations between divergence-free and Hamiltonian dynamics ⋮ Conservative flows with various types of shadowing ⋮ Contributions to the geometric and ergodic theory of conservative flows ⋮ Hamiltonian suspension of perturbed Poincaré sections and an application

• Connecting invariant manifolds and the solution of the \(C^ 1\) stability and \(\Omega\)-stability conjectures for flows
• A generic incompressible flow is topological mixing
• On \(C^1\)-robust transitivity of volume-preserving flows
• Homoclinic tangencies versus uniform hyperbolicity for conservative 3-flows
• A proof of the \(C^ 1\) stability conjecture
• Against the \(C^2\) closing lemma
• Contributions to the stability conjecture
• The star systems \({\mathcal H}^*\) and a proof of the \(C^1 \Omega\)-stability conjecture for flows
• Homoclinic tangencies and hyperbolicity for surface diffeomorphisms
• Correction to: Connecting invariant manifolds and the solution of the \(C^1\) stability and \(\Omega\)-stability conjectures for flows.
• An ergodic closing lemma
• \({\mathcal X}^*\) plus axiom A does non imply no-cycle
• On the dynamics of dominated splitting
• Nonsingular star flows satisfy Axiom A and the no-cycle condition
• Robustly transitive singular sets via approach of an extended linear Poincaré flow
• The C¹ Closing Lemma, including Hamiltonians
• On the stability of the set of hyperbolic closed orbits of a Hamiltonian
• A counter-example to a C² closing lemma
• Regularisation C∞ des champs vectoriels qui préservent l'élément de volume
• Diffeomorphisms in ℱ¹(M) satisfy Axiom A
• 𝐶¹ Connecting Lemmas
• A pasting lemma and some applications for conservative systems
• Projective hyperbolicity and fixed points
• Differentiable dynamical systems
• Generic Properties of Conservative Systems
• Vector fields in the interior of Kupka-Smale systems satisfy Axiom A.