Verfügbarkeit: Mathematical biology

Mathematical biology:

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Bibliographische Detailangaben
1. Verfasser:	Murray, James D. 1931- (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Berlin [u.a.] Springer 1993
Ausgabe:	2., corr. ed.
Schriftenreihe:	Biomathematics 19
Schlagworte:	Mathematics Biologia - modelli matematici Biomathematik Mathematik Biologie Mathematisches Modell
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	Literaturverz. S. 723 - 743 Später mehrbd. begrenztes Werk
Beschreibung:	XIV, 767 S. Ill., graph. Darst.
ISBN:	354057204X 038757204X

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Datensatz im Suchindex

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adam_text	Table of Contents 1. Continuous Population Models for Single Species 1 1.1 Continuous Growth Models 1 1.2 Insect Outbreak Model: Spruce Budworm 4 1.3 Delay Models 8 1.4 Linear Analysis of Delay Population Models: Periodic Solutions 12 1.5 Delay Models in Physiology: Dynamic Diseases 15 1.6 Harvesting a Single Natural Population 24 1.7 Population Model with Age Distribution 29 Exercises 33 2. Discrete Population Models for a Single Species 36 2.1 Introduction: Simple Models 36 2.2 Cobwebbing: A Graphical Procedure of Solution 38 2.3 Discrete Logistic Model: Chaos 41 2.4 Stability, Periodic Solutions and Bifurcations 47 2.5 Discrete Delay Models 51 2.6 Fishery Management Model 54 2.7 Ecological Implications and Caveats 57 Exercises 59 3. Continuous Models for Interacting Populations 63 3.1 Predator Prey Models: Lotka Volterra Systems 63 3.2 Complexity and Stability 68 3.3 Realistic Predator Prey Models 70 3.4 Analysis of a Predator Prey Model with Limit Cycle Periodic Behaviour: Parameter Domains of Stability 72 3.5 Competition Models: Principle of Competitive Exclusion ... 78 3.6 Mutualism or Symbiosis 83 3.7 General Models and Some General and Cautionary Remarks . 85 3.8 Threshold Phenomena 89 Exercises 92 Denotes sections in which the mathematics is at a higher level. These sections can be omitted without loss of continuity. X Table of Contents 4. Discrete Growth Models for Interacting Populations 95 4.1 Predator Prey Models: Detailed Analysis 96 4.2 Synchronized Insect Emergence: 13 Year Locusts 100 4.3 Biological Pest Control: General Remarks 106 Exercises 107 5. Reaction Kinetics 109 5.1 Enzyme Kinetics: Basic Enzyme Reaction 109 5.2 Michaelis Menten Theory: Detailed Analysis and the Pseudo Steady State Hypothesis HI 5.3 Cooperative Phenomena 118 5.4 Autocatalysis, Activation and Inhibition 122 5.5 Multiple Steady States, Mushrooms and Isolas 130 Exercises 137 6. Biological Oscillators and Switches 140 6.1 Motivation, History and Background 140 6.2 Feedback Control Mechanisms 143 6.3 Oscillations and Switches Involving Two or More Species: General Qualitative Results 148 6.4 Simple Two Species Oscillators: Parameter Domain Determination for Oscillations 156 6.5 Hodgkin Huxley Theory of Nerve Membranes: FitzHugh Nagumo Model 161 6.6 Modelling the Control of Testosterone Secretion 166 Exercises 175 7. Belousov Zhabotinskii Reaction 1^9 7.1 Belousov Reaction and the Field Noyes (FN) Model 179 7.2 Linear Stability Analysis of the FN Model and Existence of Limit Cycle Solutions 183 7.3 Non local Stability of the FN Model 187 7.4 Relaxation Oscillators: Approximation for the Belousov Zhabotinskii Reaction 190 7.5 Analysis of a Relaxation Model for Limit Cycle Oscillations in the Belousov Zhabotinskii Reaction 192 Exercises 199 8. Perturbed and Coupled Oscillators and Black Holes 200 8.1 Phase Resetting in Oscillators 200 8.2 Phase Resetting Curves 204 8.3 Black Holes 208 8.4 Black Holes in Real Biological Oscillators 21° 8.5 Coupled Oscillators: Motivation and Model System 2^ Table of Contents XI 8.6 Singular Perturbation Analysis: Preliminary Transformation . 217 8.7 Singular Perturbation Analysis: Transformed System .... 220 8.8 Singular perturbation Analysis: Two Time Expansion .... 223 8.9 Analysis of the Phase Shift Equation and Application to Coupled Belousov Zhabotinskii Reactions 227 Exercises 231 9. Reaction Diffusion, Chemotaxis and Non local Mechanisms . . . 232 9.1 Simple Random Walk Derivation of the Diffusion Equation . . 232 9.2 Reaction Diffusion Equations 236 9.3 Models for Insect Dispersal 238 9.4 Chemotaxis 241 9.5 Non local Effects and Long Range Diffusion 244 9.6 Cell Potential and Energy Approach to Diffusion 249 Exercises 252 10. Oscillator Generated Wave Phenomena and Central Pattern Generators 254 10.1 Kinematic Waves in the Belousov Zhabotinskii Reaction . . . 254 10.2 Central Pattern Generator: Experimental Facts in the Swimming of Fish 258 10.3 Mathematical Model for the Central Pattern Generator . . . 261 10.4 Analysis of the Phase Coupled Model System 268 Exercises 273 11. Biological Waves: Single Species Models 274 11.1 Background and the Travelling Wave Form 274 11.2 Fisher Equation and Propagating Wave Solutions 277 11.3 Asymptotic Solution and Stability of Wavefront Solutions of the Fisher Equation 281 11.4 Density Dependent Diffusion Reaction Diffusion Models and Some Exact Solutions 286 11.5 Waves in Models with Multi Steady State Kinetics: The Spread and Control of an Insect Population 297 11.6 Calcium Waves on Amphibian Eggs: Activation Waves on Medaka Eggs 305 Exercises 309 12. Biological Waves: Multi species Reaction Diffusion Models .... 311 12.1 Intuitive Expectations 311 12.2 Waves of Pursuit and Evasion in Predator Prey Systems . . . 315 12.3 Travelling Fronts in the Belousov Zhabotinskii Reaction . . . 322 12.4 Waves in Excitable Media 328 XII Table of Contents 12.5 Travelling Wave Trains in Reaction Diffusion Systems with Oscillatory Kinetics 336 12.6 Linear Stability of Wave Train Solutions of X ui Systems . . . 340 12.7 Spiral Waves 343 12.8 Spiral Wave Solutions of A w Reaction Diffusion Systems . . . 350 Exercises 356 13. Travelling Waves in Reaction Diffusion Systems with Weak Diffusion: Analytical Techniques and Results 360 13.1 Reaction Diffusion System with Limit Cycle Kinetics and Weak Diffusion: Model and Transformed System 360 13.2 Singular Perturbation Analysis: The Phase Satisfies Burgers Equation 363 13.3 Travelling Wavetrain Solutions for Reaction Diffusion Systems with Limit Cycle Kinetics and Weak Diffusion: Comparison with Experiment 367 14. Spatial Pattern Formation with Reaction/Population Interaction Diffusion Mechanisms 372 14.1 Role of Pattern in Developmental Biology 372 14.2 Reaction Diffusion (Turing) Mechanisms 375 14.3 Linear Stability Analysis and Evolution of Spatial Pattern: General Conditions for Diffusion Driven Instability 380 14.4 Detailed Analysis of Pattern Initiation in a Reaction Diffusion Mechanism 387 14.5 Dispersion Relation, Turing Space, Scale and Geometry Effects in Pattern Formation in Morphogenetic Models 397 14.6 Mode Selection and the Dispersion Relation 408 14.7 Pattern Generation with Single Species Models: Spatial Heterogeneity with the Spruce Budworm Model . . . 414 14.8 Spatial Patterns in Scalar Population Interaction Reaction Diffusion Equations with Convection: Ecological Control Strategies 419 14.9 Nonexistence of Spatial Patterns in Reaction Diffusion Systems: General and Particular Results 424 Exercises 430 15. Animal Coat Patterns and Other Practical Applications of Reaction Diffusion Mechanisms 435 15.1 Mammalian Coat Patterns How the Leopard Got Its Spots . 436 15.2 A Pattern Formation Mechanism for Butterfly Wing Patterns . 448 15.3 Modelling Hair Patterns in a Whorl in Acetabularia 468 Table of Contents XIII 16. Neural Models of Pattern Formation 481 16.1 Spatial Patterning in Neural Firing with a Simple Activation Inhibition Model 481 16.2 A Mechanism for Stripe Formation in the Visual Cortex . . . 489 16.3 A Model for the Brain Mechanism Underlying Visual Hallucination Patterns 494 16.4 Neural Activity Model for Shell Patterns 505 Exercises 523 17. Mechanical Models for Generating Pattern and Form in Development 525 17.1 Introduction and Background Biology 525 17.2 Mechanical Model for Mesenchymal Morphogenesis 528 17.3 Linear Analysis, Dispersion Relation and Pattern Formation Potential 538 17.4 Simple Mechanical Models Which Generate Spatial Patterns with Complex Dispersion Relations 542 17.5 Periodic Patterns of Feather Germs 554 17.6 Cartilage Condensations in Limb Morphogenesis 558 17.7 Mechanochemical Model for the Epidermis 566 17.8 Travelling Wave Solutions of the Cytogel Model 572 17.9 Formation of Microvilli 579 17.10 Other Applications of Mechanochemical Models 586 Exercises 590 18. Evolution and Developmental Programmes 593 18.1 Evolution and Morphogenesis 593 18.2 Evolution and Morphogenetic Rules in Cartilage Formation in the Vertebrate Limb 599 18.3 Developmental Constraints, Morphogenetic Rules and the Consequences for Evolution 606 19. Epidemic Models and the Dynamics of Infectious Diseases .... 610 19.1 Simple Epidemic Models and Practical Applications 611 19.2 Modelling Venereal Diseases 619 19.3 Multi group Model for Gonorrhea and Its Control 623 19.4 AIDS: Modelling the Transmission Dynamics of the Human Immunodeficiency Virus (HIV) 624 19.5 Modelling the Population Dynamics of Acquired Immunity to Parasite Infection 630 *19.6 Age Dependent Epidemic Model and Threshold Criterion . . 640 19.7 Simple Drug Use Epidemic Model and Threshold Analysis . . 645 Exercises 649 XIV Table of Contents 20. Geographic Spread of Epidemics 651 20.1 Simple Model for the Spatial Spread of an Epidemic .... 651 20.2 Spread of the Black Death in Europe 1347 1350 655 20.3 The Spatial Spread of Rabies Among Foxes I: Background and Simple Model 659 20.4 The Spatial Spread of Rabies Among Foxes II: Three Species (SIR) Model 666 20.5 Control Strategy Based on Wave Propagation into a Non epidemic Region: Estimate of Width of a Rabies Barrier . 681 20.6 Two Dimensional Epizootic Fronts and Effects of Variable Fox Densities: Quantitative Predictions for a Rabies Outbreak in England 689 Exercises 696 Appendices 697 1. Phase Plane Analysis 697 2. Routh Hurwitz Conditions, Jury Conditions, Descartes Rule of Signs and Exact Solutions of a Cubic 702 3. Hopf Bifurcation Theorem and Limit Cycles 706 4. General Results for the Laplacian Operator in Bounded Domains 720 Bibliography 723 Index 745
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spelling	Murray, James D. 1931- Verfasser (DE-588)129898708 aut Mathematical biology J. D. Murray 2., corr. ed. Berlin [u.a.] Springer 1993 XIV, 767 S. Ill., graph. Darst. txt rdacontent n rdamedia nc rdacarrier Biomathematics 19 Literaturverz. S. 723 - 743 Später mehrbd. begrenztes Werk Mathematics cabt Biologia - modelli matematici sbt Biomathematik Mathematik Biomathematik (DE-588)4139408-2 gnd rswk-swf Biologie (DE-588)4006851-1 gnd rswk-swf Mathematisches Modell (DE-588)4114528-8 gnd rswk-swf Biomathematik (DE-588)4139408-2 s DE-604 Biologie (DE-588)4006851-1 s Mathematisches Modell (DE-588)4114528-8 s 1\p DE-604 Biomathematics 19 (DE-604)BV000894631 19 HBZ Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=005860477&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis 1\p cgwrk 20201028 DE-101 https://d-nb.info/provenance/plan#cgwrk
spellingShingle	Murray, James D. 1931- Mathematical biology Biomathematics Mathematics cabt Biologia - modelli matematici sbt Biomathematik Mathematik Biomathematik (DE-588)4139408-2 gnd Biologie (DE-588)4006851-1 gnd Mathematisches Modell (DE-588)4114528-8 gnd
subject_GND	(DE-588)4139408-2 (DE-588)4006851-1 (DE-588)4114528-8
title	Mathematical biology
title_auth	Mathematical biology
title_exact_search	Mathematical biology
title_full	Mathematical biology J. D. Murray
title_fullStr	Mathematical biology J. D. Murray
title_full_unstemmed	Mathematical biology J. D. Murray
title_short	Mathematical biology
title_sort	mathematical biology
topic	Mathematics cabt Biologia - modelli matematici sbt Biomathematik Mathematik Biomathematik (DE-588)4139408-2 gnd Biologie (DE-588)4006851-1 gnd Mathematisches Modell (DE-588)4114528-8 gnd
topic_facet	Mathematics Biologia - modelli matematici Biomathematik Mathematik Biologie Mathematisches Modell
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work_keys_str_mv	AT murrayjamesd mathematicalbiology

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