A Poincare-Hopf theorem for noncompact manifolds

A. Cima; A. Gasull; F. Mañosas; Jordi Villadelprat Yague

doi:10.1016/S0040-9383(97)00021-9

A Poincare-Hopf theorem for noncompact manifolds

A. Cima, A. Gasull, F. Mañosas, Jordi Villadelprat Yague

Department of Mathematics

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6 Citations (Scopus)

Abstract

We provide the natural extension, from the dynamical point of view, of the Poincaré-Hopf theorem to noncompact manifolds. On the other hand, given a compact set K being an attractor for a flow generated by a C1 tangent vector field X on an n-manifold, we prove that the Euler characteristic of its region of attraction A, χ(A), is defined and satisfies Ind(X) = (−1)nχ(A). Finally we prove that χ(A) = χ(K) when K is an euclidean neighbourhood retract being asymptotically stable and invariant

Original language	English
Pages (from-to)	261-277
Number of pages	17
Journal	Topology
Volume	37
Issue number	2
DOIs	https://doi.org/10.1016/S0040-9383(97)00021-9
Publication status	Published - 1 Jan 1998

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title = "A Poincare-Hopf theorem for noncompact manifolds",

abstract = "We provide the natural extension, from the dynamical point of view, of the Poincar{\'e}-Hopf theorem to noncompact manifolds. On the other hand, given a compact set K being an attractor for a flow generated by a C1 tangent vector field X on an n-manifold, we prove that the Euler characteristic of its region of attraction A, χ(A), is defined and satisfies Ind(X) = (−1)nχ(A). Finally we prove that χ(A) = χ(K) when K is an euclidean neighbourhood retract being asymptotically stable and invariant ",

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N2 - We provide the natural extension, from the dynamical point of view, of the Poincaré-Hopf theorem to noncompact manifolds. On the other hand, given a compact set K being an attractor for a flow generated by a C1 tangent vector field X on an n-manifold, we prove that the Euler characteristic of its region of attraction A, χ(A), is defined and satisfies Ind(X) = (−1)nχ(A). Finally we prove that χ(A) = χ(K) when K is an euclidean neighbourhood retract being asymptotically stable and invariant

AB - We provide the natural extension, from the dynamical point of view, of the Poincaré-Hopf theorem to noncompact manifolds. On the other hand, given a compact set K being an attractor for a flow generated by a C1 tangent vector field X on an n-manifold, we prove that the Euler characteristic of its region of attraction A, χ(A), is defined and satisfies Ind(X) = (−1)nχ(A). Finally we prove that χ(A) = χ(K) when K is an euclidean neighbourhood retract being asymptotically stable and invariant

UR - https://www.scopus.com/pages/publications/0032015614

U2 - 10.1016/S0040-9383(97)00021-9

DO - 10.1016/S0040-9383(97)00021-9

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SN - 0040-9383

VL - 37

SP - 261

EP - 277

JO - Topology

JF - Topology

IS - 2

ER -

A Poincare-Hopf theorem for noncompact manifolds

Abstract

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