Authors: Đorić, Maša 
Affiliations: Mathematics 
Mathematical Institute of the Serbian Academy of Sciences and Arts 
Title: POLYNOMIAL ENTROPY ON THE n-FOLD SYMMETRIC PRODUCT AND ITS SUSPENSION
Journal: Glasnik Matematicki Series III
Volume: 61
Issue: 81
First page: 59
Last page: 76
Issue Date: 2026
Rank: M22
ISSN: 0017-095X
Abstract: 
We prove that the polynomial entropy of the induced map
Fn(f ) on the n-fold symmetric product of a compact space X and its sus-
pension are both equal to nhpol(f ), when f : X → X is a homeomorphism
with a finite chain recurrent set CR(f ). We also give a lower bound for
the polynomial entropy on the suspension, for a homeomorphism f with
at least one wandering point, under certain assumptions.
Keywords: Polynomial entropy | homeomorphism | hyperspace | n-fold symmetric product | symmetric product suspension
Publisher: Croatian Mathematical Society; Department of Mathematics, University of Zagreb, Croatia

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