Lefschetz zeta function

id: lefschetz-zeta-function-291-9550103
title: Lefschetz zeta function
text: In mathematics, the Lefschetz zeta-function is a tool used in topological periodic and fixed point theory, and dynamical systems. Given a continuous map f : X → X , the zeta-function is defined as the formal series where L is the Lefschetz number of the n -th iterate of f . This zeta-function is of note in topological periodic point theory because it is a single invariant containing information about all iterates of f .
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original url: https://en.wikipedia.org/wiki/Lefschetz_zeta_function
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date modified: 2023-04-27T02:29:26Z
main entity: {"identifier":"Q6516739","url":"https://www.wikidata.org/entity/Q6516739"}
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integrity: 13

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