It is well known that hyperbolic dynamical systems have a finite number of attractors. On the other hand, Newhouse has shown that for there exists a large class of diffeomorphisms exhibiting infinitely many sinks - these dynamics appear near some homoclinic tangencies. I will present a result obtained with R. Potrie and M. Sambarino: on 3-dimensional manifolds, the C¹-generic diffeomorphisms far from the homoclinic tangencies have only finitely many attractors. This is based on geometrical properties of the unstable lamination of partially hyperbolic attractor with one-dimensional center.