On a topological classification of diffeomorphisms on 3-manifolds with two-dimensional nonwandering set

A class of structurally stable diffeomorphisms on 3-manifolds is concidered under conditions that nonwandering set of any diffeomorphisms consists of surface two dimensional attractors and repellers. Under additional suggesting concerning of behavior of intersection two dimensional manifolds of points of basic sets are founded necessary and sufficient conditions of topological conjugacy of diffeomorphisms from concidered class.