Chaos for Differential Equations with Multivalued Impulses
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Publication:4997479
DOI10.1142/S0218127421501133zbMath1475.37022OpenAlexW3176582225WikidataQ115245937 ScholiaQ115245937MaRDI QIDQ4997479
Publication date: 29 June 2021
Published in: International Journal of Bifurcation and Chaos (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1142/s0218127421501133
periodic solutionschaosNielsen numberpositive topological entropydifferential equations with multivalued impulses
Ordinary differential equations with impulses (34A37) Topological entropy (37B40) Complex behavior and chaotic systems of ordinary differential equations (34C28)
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Cites Work
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- Topological entropy for set-valued maps
- Multiple bounded solutions of differential inclusions: The Nielsen theory approach
- Topological entropy for discontinuous semiflows
- Periodic points of multivalued mappings with applications to differential inclusions on tori.
- Estimation of the number of periodic orbits
- A generalized Nielsen number and multiplicity results for differential inclusions
- Chaos for multivalued maps and induced hyperspace maps
- Lifting classes for the fixed point theory of \(n\)-valued maps
- Relative Nielsen numbers, braids and periodic segments
- Some counter-examples in topological entropy
- Continuum-wise expansiveness and specification for set-valued functions and topological entropy
- An index and a Nielsen number for n-valued multifunctions
- The least number of fixed points of bimaps
- Fixed Points of n-Valued Multimaps of the Circle
- Calculation of Lefschetz and Nielsen numbers in hyperspaces for fractals and dynamical systems
- Lectures on Nielsen fixed point theory
- A minimum theorem for n-valued multifunctions
- A Nielsen number for fixed points and near points of small multifunctions
- Dynamical zeta functions, Nielsen theory and Reidemeister torsion
- Corrigendum to "Topological entropy for impulsive differential equations" [Electron. J. Qual. Theory Differ. Equ. 2020, No. 68, 1–15]
- Topological entropy of Markov set-valued functions
- Topological entropy on set-valued functions
- Topological Entropy
- Entropy for Group Endomorphisms and Homogeneous Spaces
- Topological entropy for impulsive differential equations
- Relative versions of the multivalued Lefschetz and Nielsen theorems and their application to admissible semi-flows
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