| Record ID | marc_columbia/Columbia-extract-20221130-025.mrc:12515357:5719 |
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LEADER: 05719cam a2200637 i 4500
001 12039658
005 20211204230755.0
006 m o d
007 cr cnu---unuuu
008 141125s2015 enka ob 001 0 eng d
035 $a(OCoLC)ocn896872806
035 $a(NNC)12039658
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020 $a9780191631450$q(electronic bk.)
020 $a0191631450$q(electronic bk.)
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020 $a9781322608549$q(ebk)
020 $z0199657041
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035 $a(OCoLC)896872806$z(OCoLC)897070353$z(OCoLC)901286291$z(OCoLC)1067223213$z(OCoLC)1103274600
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082 04 $a531.1$223
049 $aZCUA
100 1 $aNolte, D. D.,$eauthor.
245 10 $aIntroduction to modern dynamics :$bchaos, networks, space and time /$cDavid D. Nolte, Purdue University.
264 1 $aOxford :$bOxford University Press,$c[2015]
264 4 $c©2015
300 $a1 online resource (432 pages) :$billustrations
336 $atext$btxt$2rdacontent
337 $acomputer$bc$2rdamedia
338 $aonline resource$bcr$2rdacarrier
504 $aIncludes bibliographical references and index.
588 0 $aPrint version record.
505 0 $aCover; Preface; Acknowledgments; Contents; Part 1 Geometric Mechanics; 1 Physics and Geometry; 1.1 Newton and geometry; 1.2 State space and flows; 1.3 Coordinate transformations; 1.4 Non-inertial transformations; 1.5 Uniformly rotating frames; 1.6 Rigid-body motion; 1.7 Summary; 1.8 Bibliography; 1.9 Homework exercises; 2 Hamiltonian Dynamics and Phase Space; 2.1 Hamilton's principle; 2.2 Conservation laws; 2.3 The Hamiltonian function; 2.4 Central force motion; 2.5 Phase space; 2.6 Integrable systems and action-angle variables; 2.7 Summary; 2.8 Bibliography; 2.9 Homework exercises.
505 8 $aPart 2 Nonlinear Dynamics3 Nonlinear Dynamics and Chaos; 3.1 One-variable dynamical systems; 3.2 Two-variable dynamical systems; 3.3 Discrete iterative maps; 3.4 Three-dimensional state space and chaos; 3.5 Fractals and strange attractors; 3.6 Hamiltonian chaos; 3.7 Summary and glossary; 3.8 Bibliography; 3.9 Homework exercises; 4 Coupled Oscillators and Synchronization; 4.1 Coupled linear oscillators; 4.2 Simple models of synchronization; 4.3 External synchronization of an autonomous phase oscillator; 4.4 External synchronization of a van der Pol oscillator.
505 8 $a4.5 Mutual synchronization of two autonomous oscillators4.6 Summary; 4.7 Bibliography; 4.8 Homework exercises; 5 Network Dynamics; 5.1 Network structures; 5.2 Random network topologies; 5.3 Diffusion and epidemics on networks; 5.4 Linear synchronization of identical oscillators; 5.5 Nonlinear synchronization of coupled phase oscillators on regular graphs; 5.6 Summary; 5.7 Bibliography; 5.8 Homework exercises; Part 3 Complex Systems; 6 Neurodynamics and Neural Networks; 6.1 Neuron structure and function; 6.2 Neuron dynamics; 6.3 Network nodes: artificial neurons.
505 8 $a6.4 Neural network architectures6.5 Hopfield neural network; 6.6 Content-addressable (associative) memory; 6.7 Summary; 6.8 Bibliography; 6.9 Homework exercises; 7 Evolutionary Dynamics; 7.1 Population dynamics; 7.2 Virus infection and immune deficiency; 7.3 The replicator equation; 7.4 The quasi-species equation; 7.5 The replicator-mutator equation; 7.6 Dynamics of finite numbers (optional); 7.7 Summary; 7.8 Bibliography; 7.9 Homework exercises; 8 Economic Dynamics; 8.1 Micro- and macroeconomics; 8.2 Supply and demand; 8.3 Business cycles; 8.4 Consumer market competition; 8.5 Macroeconomics.
505 8 $a8.6 Stochastic dynamics and stock prices (optional)8.7 Summary; 8.8 Bibliography; 8.9 Homework exercises; Part 4 Relativity and Space-Time; 9 Metric Spaces and Geodesic Motion; 9.1 Manifolds and metric tensors; 9.2 Reciprocal spaces in physics; 9.3 Derivative of a tensor; 9.4 Geodesic curves in configuration space; 9.5 Geodesic motion; 9.6 Summary; 9.7 Bibliography; 9.8 Homework exercises; 10 Relativistic Dynamics; 10.1 The special theory; 10.2 Lorentz transformations; 10.3 Metric structure of Minkowski space; 10.4 Relativistic dynamics; 10.5 Linearly accelerating frames (relativistic).
520 $aThe best parts of physics are the last topics that our students ever see. These are the exciting new frontiers of nonlinear and complex systems that are at the forefront of university research and are the basis of many high-tech businesses. Topics such as traffic on the World Wide Web, the spread of epidemics through globally-mobile populations, or the synchronization of global economies are governed by universal principles just as profound as Newton's laws. Nonetheless, the conventional university physics curriculum reserves most of these topics for advanced graduate study. Two justifications.
650 0 $aDynamics.
650 7 $aSCIENCE$xMechanics$xGeneral.$2bisacsh
650 7 $aSCIENCE$xMechanics$xSolids.$2bisacsh
650 7 $aDynamics.$2fast$0(OCoLC)fst00900295
655 4 $aElectronic books.
776 08 $iPrint version:$aNolte, D.D.$tIntroduction to modern dynamics. Nolte, networks, space and time$z0199657041$w(OCoLC)896831759
856 40 $uhttp://www.columbia.edu/cgi-bin/cul/resolve?clio12039658$zAll EBSCO eBooks
852 8 $blweb$hEBOOKS