Nondegenerate homoclinic tangency and hyperbolic sets

## Abstract A tangency set of PG __(d,q)__ is a set __Q__ of points with the property that every point __P__ of __Q__ lies on a hyperplane that meets __Q__ only in __P__. It is known that a tangency set of PG __(3,q)__ has at most $q^2+1$ points with equality only if it is an ovoid. We show that a

Some codimension 2 projective complete intersections are related to local hypersurface singularities. Necessary and sufficient conditions are given such that the singularities obtained are isolated. Incidentally we prove the finitude of the tangency set of two equidimensional smooth complete interse

Klee introduced (Asymptotes and projections of convex sets, Math

In this paper we prove that any C 1 vector field defined on a three-dimensional manifold can be approximated by one that is uniformly hyperbolic, or that exhibits either a homoclinic tangency or a singular cycle. This proves an analogous statement of a conjecture of Palis for diffeomorphisms in the