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oai:uvadoc.uva.es:10324/681912024-12-03T14:43:54Zcom_10324_1129com_10324_931com_10324_894col_10324_1193

Sanz Sánchez, Fernando 1998 Let \gamma be an integral solution of an analytic real vector field defined in a neighbordhood of 0\in R3. Suppose that \gamma has a single limit point at 0. We say that \gamma is non oscillating if, for any analytic surface H, either \gamma is contained in H or \gamma cuts H only finitely many times. In this paper we give a sufficient condition for \gamma 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 𝛻g f of an analytic function f of order 2 at 0, where g is an analytic riemannian metric. application/pdf https://uvadoc.uva.es/handle/10324/68191 eng Centre Mersenne Non oscillating solutions of analytic gradient vector fields info:eu-repo/semantics/article TEXT UVaDOC. Repositorio Documental de la Universidad de Valladolid Hispana