Mappings and homological properties in the Conley index theory

doi:10.1017/S014338570000941X

Abstract

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The role in the Conley index of mappings between flows is considered. A class of maps is introduced which induce maps on the index level. With the addition of such maps to the theory, the homology Conley index becomes a homology theory. Using this structure, an analogue of the Lefschetz theorem is proved for the Conley index. This gives a new condition for detecting fixed points of flows, extending the classical Euler characteristic condition.

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Mappings and homological properties in the Conley index theory

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