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Algebraic periods and minimal number of periodic points for smooth self-maps of 1-connected 4-manifolds with definite intersection forms

Abstract

Let M be a closed 1-connected smooth 4-manifolds, and let r be a non-negative integer. We study the problem of finding minimal number of r-periodic points in the smooth homotopy class of a given map f: M-->M. This task is related to determining a topological invariant D^4_r[f], defined in Graff and Jezierski (Forum Math 21(3):491–509, 2009), expressed in terms of Lefschetz numbers of iterations and local fixed point indices of iterations. Previously, the invariant was computed for self-maps of some 3-manifolds. In this paper, we compute the invariants D^4_r[f] for the self-maps of closed 1-connected smooth 4-manifolds with definite intersection forms (i.e., connected sums of complex projective planes). We also present some efficient algorithmic approach to investigate that problem.

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Details

Category:
Articles
Type:
artykuły w czasopismach
Published in:
Journal of Fixed Point Theory and Applications no. 26,
ISSN: 1661-7738
Language:
English
Publication year:
2024
Bibliographic description:
Duan H., Graff G., Jezierski J., Myszkowski A.: Algebraic periods and minimal number of periodic points for smooth self-maps of 1-connected 4-manifolds with definite intersection forms// Journal of Fixed Point Theory and Applications -Vol. 26,iss. Art id 23 (2024), s.1-21
DOI:
Digital Object Identifier (open in new tab) 10.1007/s11784-024-01108-9
Sources of funding:
Verified by:
Gdańsk University of Technology

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