SLIM21

Sort Order Display Format Items / Page  
 
  Click the serial number on the left to view the details of the item.
 #  AuthorTitleAccn#YearItem Type Claims
1 Morris W. Hirsch Differential equations, dynamical systems, and an introduction to chaos 026032 2013 Book  
2 Chaouqi Misbah Dynamiques complexes et morphogen�ese I01778 2011 eBook  
3 Ivo Petr�a�s Fractional-order nonlinear systems I01644 2011 eBook  
4 Valentin Flunkert Delay-coupled complex systems I01630 2011 eBook  
5 Markus Aschwanden Self-organized criticality in astrophysics I01524 2011 eBook  
6 M. Lakshmanan Dynamics of nonlinear time-delay systems I01518 2010 eBook  
7 Philipp H�ovel Control of complex nonlinear systems with delay I01412 2010 eBook  
8 Giulio Casati (ed.) Complex phenomena in nanoscale systems I01088 2009 eBook  
9 Panayotis G. Kevrekidis discrete nonlinear Schr�odinger equation I01076 2009 eBook  
10 Visarath In (ed.) Applications of nonlinear dynamics I01005 2009 eBook  
(page:1 / 2) [#20]    Next Page   Last Page 

1.    
No image available
TitleDifferential equations, dynamical systems, and an introduction to chaos
Author(s)Morris W. Hirsch;Stephen Smale;Robert L. Devaney
Edition3rd ed.
PublicationAmsterdam, Elsevier Science Publishers, 2013.
Descriptionxiv, 418p.
Abstract Notehas been used by professors as the primary text for undergraduate and graduate level courses covering differential equations. It provides a theoretical approach to dynamical systems and chaos written for a diverse student population among the fields of mathematics, science, and engineering. Prominent experts provide everything students need to know about dynamical systems as students seek to develop sufficient mathematical skills to analyze the types of differential equations that arise in their area of study. The authors provide rigorous exercises and examples clearly and easily by slowly introducing linear systems of differential equations. Calculus is required as specialized advanced topics not usually found in elementary differential equations courses are included, such as exploring the world of discrete dynamical systems and describing chaotic systems. This is a classic text by three of the world's most prominent mathematicians. It continues the tradition of expository excellence. It contains updated material and expanded applications for use in applied studies.
ISBN,Price9789381269787 : Rs. 595.00(PB)
Classification517.938
Keyword(s)1. CHAOS 2. DIFFERENTIAL EQUATIONS 3. DYNAMICAL SYSTEMS 4. NONLINEAR SYSTEMS 5. PLANAR SYSTEMS
Item TypeBook
Multi-Media Links
Please Click here for eBook
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
026032   517.938/HIR/026032  On Shelf    
OB1406   517.938/HIR/  On Shelf    

+Copy Specific Information
2.     
No image available
TitleDynamiques complexes et morphogen�ese : Introduction aux sciences non lin�eaires
Author(s)Chaouqi Misbah
PublicationParis, Springer, 2011.
Description1 online resource (xxi, p.) : ill
Contents Note1 Pr�esentation -- 2 Introduction �el�ementaire aux bifurcations �a une dimension -- 3 Les autres bifurcations g�en�eriques -- 4 Classification des sept catastrophes �el�ementaires -- 5 Bifurcation de Hopf -- 6 Equation d{u2019}amplitude pour une bifurcation de Hopf -- 7 Instabilit�e param�etrique et autres instabilit�es -- 8 Introduction au chaos -- 9 Naissance de l{u2019}ordre spatial unidimensionnel -- 10 Universalit�e au voisinage du seuil -- 11 Fronts entre domaines -- 12 ordres et d�esordres spatial et temporel -- 13 Structures bidimensionnelles -- 14 Conclusion
NotesIncludes bibliographical references and index
Keyword(s)1. EBOOK 2. EBOOK - SPRINGER 3. MORPHOGENESIS 4. NONLINEAR SYSTEMS
Item TypeeBook
Multi-Media Links
Please Click Here for the Online Book
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
I01778     On Shelf    

3.     
No image available
TitleFractional-order nonlinear systems : modeling, analysis and simulation
Author(s)Ivo Petr�a�s
PublicationBeijing, 1. Higher Education Press 2. Springer, 2011.
Description1 online resource (xvi, 218 p.)
NotesIncludes bibliographical references and index
Keyword(s)1. CHAOTIC BEHAVIOR IN SYSTEMS 2. EBOOK 3. EBOOK - SPRINGER 4. FRACTIONAL CALCULUS 5. NONLINEAR SYSTEMS
Item TypeeBook
Multi-Media Links
Please Click Here for the Online Book
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
I01644     On Shelf    

4.     
No image available
TitleDelay-coupled complex systems : and applications to lasers
Author(s)Valentin Flunkert
PublicationBerlin, Springer, 2011.
Description1 online resource (xiii, 180 p.)
Abstract NoteThis thesis deals with the effects of time-delay in complex nonlinear systems and in particular with its applications in complex networks, and relates it to control theory and nonlinear optics. Delays arise naturally in networks of coupled systems due to finite signal propagation speeds and are thus a key issue in many areas of physics, biology, medicine, and technology. Synchronization phenomena in these networks play an important role, e.g., in the context of learning, cognitive and pathological states in the brain, for secure communication with chaotic lasers or gene regulation. The work includes both novel results on the control of complex dynamics by time-delayed feedback and new fundamental insights into the interplay of delay and synchronization. One of the most interesting results here is a solution to the problem of complete synchronization in general networks with large coupling delay, i.e., large distances between the nodes, by giving a universal classification of networks which has a wide range of interdisciplinary applications
Contents NoteStabilization of Odd-Number Orbits -- Time Delayed Feedback Control -- Counterexample -- Odd-Number Orbits Close to a Fold Bifurcation -- Towards Stabilization of Odd-Number Orbits in Experiments -- Stabilization with Symmetric Feedback Matrices -- Application to Laser Systems -- Stabilization of Anti-Phase Orbits -- Synchronization of Delay Coupled Systems -- Structure of the Master Stability Function for Large Delay -- Lang Kobayashi Laser Equations -- Necessary Conditions for Synchronization of Lasers -- Bubbling -- Summary and Conclusions -- Appendix -- Index
NotesIncludes bibliographical references and index
Keyword(s)1. COMPUTER SCIENCE 2. CONTROL THEORY 3. EBOOK 4. EBOOK - SPRINGER 5. NONLINEAR SYSTEMS
Item TypeeBook
Multi-Media Links
Please Click Here for the Online Book
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
I01630     On Shelf    

5.     
No image available
TitleSelf-organized criticality in astrophysics : the statistics of nonlinear processes in the universe
Author(s)Markus Aschwanden
PublicationHeidelberg, Springer, 2011.
Description1 online resource (xiv, 416 p.) : ill. (some col.), maps (some col.)
Abstract NoteThe concept of 'self-organized criticality' (SOC) has been applied to a variety of problems, ranging from population growth and traffic jams to earthquakes, landslides and forest fires. The technique is now being applied to a wide range of phenomena in astrophysics, such as planetary magnetospheres, solar flares, cataclysmic variable stars, accretion disks, black holes and gamma-ray bursts, and also to phenomena in galactic physics and cosmology. Self-organized Criticality in Astrophysics introduces the concept of SOC and shows that, due to its universality and ubiquity, it is a law of nature. The theoretical framework and specific physical models are described, together with a range of applications in various aspects of astrophyics. The mathematical techniques, including the statistics of random processes, time series analysis, time scale and waiting time distributions, are presented and the results are applied to specific observations of astrophysical phenomena
Contents NoteSelf-organized criticality phenomena -- Numerical SOC models -- Analytical SOC models -- Statistics of random processes -- Waiting-time distributions -- Event detection methods -- Occurrence frequency distributions -- Fractal geometry -- Physical SOC models -- SOC-like models
NotesIncludes bibliographical references (p. [359]-390) and index
Keyword(s)1. ASTROPHYSICS 2. Critical phenomena (Physics) 3. EBOOK 4. EBOOK - SPRINGER 5. NONLINEAR SYSTEMS 6. NONLINEAR THEORIES 7. SCIENCE / Physics / Astrophysics 8. SELF-ORGANIZING SYSTEMS
Item TypeeBook
Multi-Media Links
Please Click Here for the Online Book
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
I01524     On Shelf    

6.     
No image available
TitleDynamics of nonlinear time-delay systems
Author(s)M. Lakshmanan;D.V. Senthilkumar
PublicationBerlin, Springer, 2010.
Description1 online resource (xvii, 313 p.) : ill
Contents NoteCover -- Preface -- Contents -- Chapter 1 Delay Differential Equations -- 1.1 Introduction -- 1.1.1 DDE with Single Constant Delay -- 1.1.2 DDE with Discrete Delays -- 1.1.3 DDE with Distributed Delay -- 1.1.4 DDE with State-Dependent Delay -- 1.1.5 DDE with Time-Dependent Delay -- 1.2 Constructing the Solution for DDEs with Single Constant Delay -- 1.2.1 Linear Delay Differential Equation -- 1.2.2 Numerical Simulation of DDEs -- 1.2.3 Nonlinear Delay Differential Equations -- 1.3 Salient Features of Chaotic Time-Delay Systems -- References -- Chapter 2 Linear Stability and Bifurcation Analysis -- 2.1 Introduction -- 2.2 Linear Stability Analysis -- 2.2.1 Example: Linear Delay Differential Equation -- 2.3 A Geometric Approach to Study Stability -- 2.3.1 Example: Linear Delay Differential Equation -- 2.4 A General Approach to Determine Linear Stability of Equilibrium Points -- 2.4.1 Characteristic Equation -- 2.4.2 Stability Conditions -- 2.4.3 Stability Curves/Surfaces in the (, a, b) Parameter Space -- 2.4.4 Extension to Coupled DDEs/Complex Scalar DDEs -- 2.4.5 Bifurcation Analysis -- 2.4.6 Results of Stability Analysis -- 2.4.7 A Theorem on the Stability of Equilibrium Points -- 2.4.8 Example: Linear Delay Differential Equation -- References -- Chapter 3 Bifurcation and Chaos in Time-Delayed Piecewise Linear Dynamical System -- 3.1 Introduction -- 3.2 Simple Scalar First Order Piecewise Linear DDE -- 3.2.1 Fixed Points and Linear Stability -- 3.3 Numerical Study of the Single Scalar Piecewise Linear Time-Delay System -- 3.3.1 Dynamics in the Pseudospace -- 3.3.2 Transients -- 3.3.3 One and Two Parameter Bifurcation Diagrams -- 3.3.4 Lyapunov Exponents and Hyperchaotic Regimes -- 3.4 Experimental Realization using PSPICE Simulation -- 3.5 Stability Analysis and Chaotic Dynamics of Coupled DDEs -- 3.5.1 Fixed Points and Linear Stability -- 3.6 Numerical Analysis of the Coupled DDE -- 3.6.1 Transients -- 3.6.2 One and Two Parameter Bifurcation Diagrams -- References -- Chapter 4 A Few Other Interesting Chaotic Delay Differential Equations -- 4.1 Introduction -- 4.2 The Mackey-Glass System: A Typical Nonlinear DDE -- 4.2.1 Mackey-Glass Time-Delay System -- 4.2.2 Fixed Points and Linear Stability Analysis -- 4.2.3 Time-Delay =0 -- 4.2.4 Time-Delay>0 -- 4.2.5 Numerical Simulation: Bifurcations and Chaos -- 4.2.6 Experimental Realization Using Electronic Circuit -- 4.3 Other Interesting Scalar Chaotic Time-Delay Systems -- 4.3.1 A Simple Chaotic Delay Differential Equation -- 4.3.2 Ikeda Time-Delay System -- 4.3.3 Scalar Time-Delay System with Polynomial Nonlinearity -- 4.3.4 Scalar Time-Delay System with Other Piecewise Linear Nonlinearities -- 4.3.5 Another Form of Scalar Time-Delay System -- 4.3.6 El Ni241;o and the Delayed Action Oscillator -- 4.4 Coupled Chaotic Time-Delay Systems -- 4.4.1 Time-Delayed Chua's Circuit -- 4.4.2 Semiconductor Lasers -- 4.4.3 Neural Networks -- References -- Chapter 5 Implications of Delay Feedback: Amplitude Death and Other Effects -- 5.1 Introduction -- 5.2 Time-Delay Induced Amplitude Death -- 5.2.1 Theoretical Study: Single Oscillator -- 5.2.2 Experimental Study -- 5.3 Amplitude Death with Distributed Delay in Coupled Limit Cycle Oscillators -- 5.4 Amplitude Death in Coupled Chaotic Oscillators -- 5.5 Amplitude
NotesIncludes bibliographical references and index
Keyword(s)1. EBOOK 2. EBOOK - SPRINGER 3. ENGINEERING 4. NONLINEAR SYSTEMS 5. TECHNOLOGY & ENGINEERING 6. Time delay systems
Item TypeeBook
Multi-Media Links
Please Click Here for the Online Book
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
I01518     On Shelf    

7.     
No image available
TitleControl of complex nonlinear systems with delay
Author(s)Philipp H�ovel
PublicationHeidelberg, Springer-Verlag, 2010.
Description1 online resource (xvi, 253 p.) : ill. (some col.)
NotesOriginally presented as author's thesis (Ph. D.)--Techniche Universit�at Berlin. -Includes bibliographical references and index
Keyword(s)1. EBOOK 2. EBOOK - SPRINGER 3. NONLINEAR SYSTEMS 4. Time delay systems
Item TypeeBook
Multi-Media Links
Please Click Here for the Online Book
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
I01412     On Shelf    

8.     
No image available
TitleComplex phenomena in nanoscale systems
Author(s)Giulio Casati (ed.);Davron Matrasulov (ed.)
PublicationDordrecht, Springer, 2009.
Description1 online resource (xiv, 273 p.) : ill. (some col.)
Notes"Proceedings of the NATO Advanced Research Workshop on Recent Advances in Nonlinear Dynamics and Complex System Physics : From Natural to Social Science and Security, Tashkent, Uzbekistan, 12-17 October 2008"--T.p. verso. -Met lit. opg
Keyword(s)1. DYNAMICS 2. EBOOK 3. EBOOK - SPRINGER 4. ENGINEERING 5. MATHEMATICS 6. NANOSCIENCE 7. NONLINEAR SYSTEMS 8. Phenomenological theory (Physics)
Item TypeeBook
Multi-Media Links
Please Click Here for the Online Book
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
I01088     On Shelf    

9.     
No image available
Titlediscrete nonlinear Schr�odinger equation : mathematical analysis, numerical computations and physical perspectives
Author(s)Panayotis G. Kevrekidis;with contributions by Ricardo Carretero-Gonz�alez ...
PublicationBerlin, Springer, 2009.
Description1 online resource (xx, 415 p.) : ill
NotesIncludes bibliographical references and index
Keyword(s)1. EBOOK 2. EBOOK - SPRINGER 3. Nichtlineare Schr�odinger-Gleichung 4. NONLINEAR SYSTEMS 5. Nonlinear wave equations 6. PHYSICS 7. Schr�odinger equation 8. SCIENCE
Item TypeeBook
Multi-Media Links
Please Click Here for the Online Book
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
I01076     On Shelf    

10.    
No image available
TitleApplications of nonlinear dynamics : model and design of complex systems
Author(s)Visarath In (ed.);Patrick Longhini (ed.);Antonio Palacios (ed.)
PublicationBerlin, Springer, 2009.
Description1 online resource
Contents NoteConstruction of a chaotic computer chip / William L. Ditto, K. Murali and Sudeshna Sinha -- Activated switching in a parametrically driven micromechanical torsional oscillator / H.B. Chan and C. Stambaugh -- Quantum nanomechanics / Pritiraj Mohanty -- Coupled-core fluxgate magnetometer / Andy Kho ... [et al.] -- Data assimilation in the detection of vortices / Andrea Barreiro ... [et al.] -- The role of receptor occupancy noise in eukaryotic chemotaxis / Wouter-Jan Rappel and Herbert Levine -- Applications of forbidden interval theorems in stochastic resonance / Bart Kosko ... [et al.] -- Smart materials and nonlinear dynamics for innovative transducers / B. And�o ... [et al.] -- Dynamics in non-uniform coupled SQUIDs / Patrick Longhini ... [et al.] -- Applications of nonlinear and reconfigurable electronic circuits / Joseph Neff ... [et al.]
NotesIncludes index. -Includes bibliographical references and index
Keyword(s)1. DYNAMICS 2. EBOOK 3. EBOOK - SPRINGER 4. ENGINEERING 5. MATHEMATICS 6. NONLINEAR SYSTEMS 7. SCIENCE
Item TypeeBook
Multi-Media Links
Please Click Here for the Online Book
Circulation Data
Accession#  Call#StatusIssued ToReturn Due On Physical Location
I01005     On Shelf    

(page:1 / 2) [#20]    Next Page   Last Page