Abstract. We explore the connected/disconnected dichotomy for the Julia set of polynomial automorphisms of C 2 . We develop several aspects of the question, which was first studied by Bedford-Smillie [BS6, BS7]. We introduce a new sufficient condition for the connectivity of the Julia set, that carries over for certain Hénon-like and birational maps. We study the structure of disconnected Julia sets and the associated invariant currents. This provides a simple approach to some results of Bedford-Smillie, as well as some new corollaries -the connectedness locus is closed, construction of external rays in the general case, etc.We also prove the following theorem: a hyperbolic polynomial diffeomorphism of C 2 with connected Julia set must have attracting or repelling orbits. This is an analogue of a well known result in one dimensional dynamics.