Title of article
Minimal Morse flows on compact manifolds
Author/Authors
Bertolim، نويسنده , , M.A. and de Rezende، نويسنده , , K.A. and Vago، نويسنده , , G.M.، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2006
Pages
17
From page
3450
To page
3466
Abstract
In this paper we prove, using the Poincaré–Hopf inequalities, that a minimal number of non-degenerate singularities can be computed in terms only of abstract homological boundary information. Furthermore, this minimal number can be realized on some manifold with non-empty boundary satisfying the abstract homological boundary information. In fact, we present all possible indices and types (connecting or disconnecting) of singularities realizing this minimal number. The Euler characteristics of all manifolds realizing this minimal number are obtained and the associated Lyapunov graphs of Morse type are described and shown to have the lowest topological complexity.
Keywords
Poincaré–Hopf inequalities , Lyapunov graphs , Conley index
Journal title
Topology and its Applications
Serial Year
2006
Journal title
Topology and its Applications
Record number
1581040
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