Abstract
We study a structure of four-dimensional phase space decomposition on trajectories of Morse-Smale flows admitting heteroclinical intersections. More precisely, we consider a class G(S4) of Morse-Smale flows on the sphere S4 such that for any flow f∈G(S4) its non-wandering set consists of exactly four equilibria: source, sink and two saddles. Wandering set of such flows contains finite number of heteroclinical curves that belong to intersection of invariant manifolds of saddle equilibria. We describe a topology of embedding of saddle equilibria’s invariant manifolds; that is the first step in the solution of topological classification problem. In particular, we prove that the closures of invariant manifolds of saddle equlibria that do not contain heteroclinical curves are locally flat 2-sphere and closed curve. These manifolds are attractor and repeller of the flow. In set of orbits that belong to the basin of attraction or repulsion we construct a section that is homeomoprhic to the direct product S2×S1. We study a topology of intersection of saddle equlibria’s invariant manifolds with this section.
Highlights
Èìåííî, ðàññìàòðèâàåòñÿ êëàññ G(S4) ïîòîêîâ Ìîðñà-Ñìåéëà íà ñôåðå S4 òàêèõ, ÷òî íåáëóæäàþùåå ìíîæåñòâî ëþáîãî ïîòîêà f ∈ G(S4) ñîñòîèò â òî÷íîñòè èç ÷åòûðåõ ñîñòîÿíèé ðàâíîâåñèÿ: èñòî÷íèêà, ñòîêà è äâóõ ñåäåë
G(S4) of Morse-Smale ows on the sphere S4 such that for any ow f ∈ G(S4) its non-wandering set consists of exactly four equilibria: source, sink and two saddles
Wandering set of such ows contains nite number of heteroclinical curves that belong to intersection of invariant manifolds of saddle equilibria
Summary
Èìåííî, ðàññìàòðèâàåòñÿ êëàññ G(S4) ïîòîêîâ Ìîðñà-Ñìåéëà íà ñôåðå S4 òàêèõ, ÷òî íåáëóæäàþùåå ìíîæåñòâî ëþáîãî ïîòîêà f ∈ G(S4) ñîñòîèò â òî÷íîñòè èç ÷åòûðåõ ñîñòîÿíèé ðàâíîâåñèÿ: èñòî÷íèêà, ñòîêà è äâóõ ñåäåë. Ïóñòü G(S4) êëàññ ïîòîêîâ Ìîðñà-Ñìåéëà íà ñôåðå S4 òàêèõ, ÷òî íåáëóæäàþùåå ìíîæåñòâî ëþáîãî ïîòîêà f ∈ G(S4) ñîñòîèò â òî÷íîñòè èç ÷åòûðåõ ñîñòîÿíèé ðàâíîâåñèÿ: èñòî÷íèêà α, ñòîêà ω è äâóõ ñåäåë σi, σj èíäåêñîâ Ìîðñà i, j ∈ {1, 2, 3} ñîîòâåòñòâåííî. Ïîýòîìó â äàëüíåéøåì áóäåì ñ÷èòàòü, ÷òî äëÿ ïðîèçâîëüíîãî ïîòîêà f t ∈ G(S4) èíäåêñû Ìîðñà ñåäëîâûõ ñîñòîÿíèé ðàâíîâåñèÿ ðàâíû 1 è 2.
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