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On weak concepts of stability

Published online by Cambridge University Press:  22 January 2016

Gikö Ikegami*
Affiliation:
Nagoya University
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The manifold in this paper is assumed to be connected differentiable of class C∞. Let Dr(M) and Ӿr(M) be the set of all diffeomorphisms and vector fields of class Cr on a manifold M with Whitney Cr topology, respectively. In [2], the concept of weak stability is defined. The definition is equivalent to the following ((2.1) of this paper); f∈Dr(M) or X ∈ Ӿr(M) is weakly (allowably) stable if and only if there is a neighborhood U of f or X in Dr(M) or Ӿr(M) such that for any (a suitable) g or YU the set of all elements topologically equivalent to g or Y is dense in U, respectively. Here, f, g ∈ Dr(M) are said to be topologically equivalent if they are topologically conjugate and X, Y ∈ Ӿr(M) are said to be topologically equivalent if there is a homeomorphism mapping any trajectory of X onto a trajectory of Y preserving the orientations of the trajectories. Similarly, weak Ω-stability is defined for f and X.

Type
Research Article
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 1974

References

[1] Ikegami, G., On classification of dynamical systems with cross-sections, Osaka J. Math. Vol. 6 (1969), 419433.Google Scholar
[2] Ikegami, G., On structural stability and weak stability of dynamical systems, Proceedings of International Conference on Manifolds and Related Topics in Topology, Tokyo Univ. Press, 1974 (to appear).Google Scholar
[3] Peixoto, M. M. and Pugh, C. C., Structurally stable systems on open manifolds are never dense, Ann. of Math. Vol. 87 (1968), 423430.Google Scholar
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