Let γ be an integral solution of an analytic real vector field ξ defined in a neighbordhood of 0 ∈ ℝ 3 . Suppose that γ has a single limit point, ω ( γ ) = { 0 } . We say that γ is non oscillating if, for any analytic surface H , either γ is contained in H or γ cuts H only finitely many times. In this paper we give a sufficient condition for γ to be non oscillating. It is established in terms of the existence of “generalized iterated tangents”, i.e. the existence of a single limit point for any transform property for the solutions of a gradient vector field ξ = ∇ g f of an analytic function f of order 2 at 0 ∈ ℝ 3 , where g is an analytic riemannian metric.