Abstract EN:

We study the transverse structure of oriented foliations Ƒ of surfaces. We want to know whether there exists a global section, i. E. A simple closed curve which is transverse to the foliation ·and cuts every leaf. Ln the first section, we use the theory of train tracks to know if there exists a minimal foliation which is transverse to Ƒ. In particular, we give an algorithm for the existence of a minimal measured flotation carried by a given train track. We also give some conditions which are equivalent to the existence of a global section. Ln the second section, we study the different train tracks which carry a given (non measured) foliation. We show that there exist certain train tracks which are universal for this property. These train tracks are the best approximation to the foliation. We introduce a certain duality for train tracks, and use this notion to prove the existence of some train track, which, up to conjugacy, carry all the measured foliations transverse to a given foliation.