© 2016

Dynamical Systems: Theoretical and Experimental Analysis

Łódź, Poland, December 7-10, 2015

  • Jan Awrejcewicz
  • Provides an overview of recent developments and trends in dynamical systems governed by non-linear ordinary differential equations

  • Applies dynamical systems theory to the fields of applied mathematics, physics, mechanics and engineering-oriented sciences

  • Includes high-quality sketches and figures derived from numerical simulations

Conference proceedings

Part of the Springer Proceedings in Mathematics & Statistics book series (PROMS, volume 182)

Table of contents

  1. Front Matter
    Pages i-xiv
  2. Marek Borowiec, Marcin Bocheński, Jarosław Gawryluk, Michał Augustyniak
    Pages 27-37
  3. Vytautas Bučinskas, Andrius Dzedzickis, Nikolaj Šešok, Ernestas Šutinys, Igor Iljin
    Pages 39-48
  4. Radek Bulín, Michal Hajžman, Štěpán Dyk, Miroslav Byrtus
    Pages 49-58
  5. Adrian Chmielewski, Robert Gumiński, Paweł Maciąg, Jędrzej Mączak
    Pages 71-82
  6. Pilade Foti, Aguinaldo Fraddosio, Salvatore Marzano, Mario Daniele Piccioni
    Pages 97-111
  7. Katica R. (Stevanović) Hedrih
    Pages 157-168
  8. Nicolae Herişanu, Vasile Marinca
    Pages 169-176
  9. David J. McKeown, William J. O’Connor
    Pages 225-240

About these proceedings


The book is the second volume of a collection of contributions devoted to analytical, numerical and experimental techniques of dynamical systems, presented at the international conference "Dynamical Systems: Theory and Applications," held in Łódź, Poland on December 7-10, 2015.

The studies give deep insight into new perspectives in analysis, simulation, and optimization of dynamical systems, emphasizing directions for future research. Broadly outlined topics covered include: bifurcation and chaos in dynamical systems, asymptotic methods in nonlinear dynamics, dynamics in life sciences and bioengineering, original numerical methods of vibration analysis, control in dynamical systems, stability of dynamical systems, vibrations of lumped and continuous sytems, non-smooth systems, engineering systems and differential equations, mathematical approaches to dynamical systems, and mechatronics.


DSTA 2015 optimization dynamical systems simulation dynamical systems asymptotic methods nonlinear dynamics lumped systems continuous vibrations systems non-smooth systems engineering systems mechatronics mathematical approaches dynamical systems

Editors and affiliations

  • Jan Awrejcewicz
    • 1
  1. 1.Dept. of Autom., Biomech. and Mechatr.Łódź University of TechnologyŁódźPoland

Bibliographic information

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