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Typ záznamu:	stať ve sborníku (D)
Domácí pracoviště:	Ústav pro výzkum a aplikace fuzzy modelování (94410)
Název:	On Topological Entropy of Zadeh's Extension Defined on Piecewise Convex Fuzzy Sets
Citace	Kupka, J. a Canovas, J. On Topological Entropy of Zadeh's Extension Defined on Piecewise Convex Fuzzy Sets. In: Advances in Intelligent Systems and Computing, vol 641 2017-09-11 Warsaw. Berlín: SPRINGER INTERNATIONAL PUBLISHING AG, 2018. s. 342-353. ISBN 978-3-319-66829-1.

Podnázev
Rok vydání:	2018
Obor:	Obecná matematika
Počet stran:	12
Strana od:	342
Strana do:	353
Forma vydání:	Tištená verze
Kód ISBN:	978-3-319-66829-1
Kód ISSN:
Název sborníku:	Advances in Intelligent Systems and Computing, vol 641
Sborník:	Mezinárodní
Název nakladatele:	SPRINGER INTERNATIONAL PUBLISHING AG
Místo vydání:	Berlín
Stát vydání:
Název konference:
Místo konání konference:	Warsaw
Datum zahájení konference:
Typ akce podle státní příslušnosti účastníků akce:	Celosvětová akce
Kód UT WoS:	000432315700031
EID:	2-s2.0-85029447490

Klíčová slova anglicky:	discrete dynamical system, topological entropy, measure theoretic entropy, Zadeh's extension
Popis v původním jazyce:	As the main result of this article we prove that a given continuous interval map and its Zadeh's extension (fuzzification) to the space of fuzzy sets with the property that alpha-cuts have at most m convex (topologically connected) components, for m being an arbitrary natural number, have both positive (resp. zero) topological entropy. Presented topics are studied also for set-valued (induced) discrete dynamical systems. The main results are proved due to variational principle describing relations between topological and measure-theoretical entropy, respectively.
Popis v anglickém jazyce:	As the main result of this article we prove that a given continuous interval map and its Zadeh?s extension (fuzzification) to the space of fuzzy sets with the property that ?-cuts have at most m convex (topologically connected) components, for m being an arbitrary natural number, have both positive (resp. zero) topological entropy. Presented topics are studied also for set-valued (induced) discrete dynamical systems. The main results are proved due to variational principle describing relations between topological and measure-theoretical entropy, respectively.

Seznam ohlasů

Ohlas

R01:	RIV/61988987:17610/18:A1901V29

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