On the dynamics of some vector fields tangent to non-integrable plane fields

Abstract

Let E3⊂ TMn be a smooth 3-distribution on a smooth manifold of dimension n and W⊂E a line field such that [W,E]⊂E. Under some orientability hypothesis, we give a necessary condition for the existence of a plane field D2 such that W⊂D and [D,D]=E. Moreover we study the case where a section of W is non-singular Morse-Smale and we get a sufficient condition for the global existence of D. As a corollary we get conditions for a non-singular vector field W on a 3-manifold to be Legendrian for a contact structure D. Similarly with these techniques we can study when an even contact structure E⊂ TM4 is induced by an Engel structure D.