Verfügbarkeit: Traffic flow on networks

Traffic flow on networks: conservation laws models

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Bibliographische Detailangaben
Hauptverfasser:	Garavello, Mauro (VerfasserIn), Piccoli, Benedetto (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Springfield, Mo. American Inst. of Math. Sciences 2006
Schriftenreihe:	AIMS series on applied mathematics 1
Schlagworte:	Mathematisches Modell Conservation laws (Mathematics) Traffic flow > Mathematical models Verkehrsnetz Verkehrsablauf
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	XVI, 243 S. graph. Darst.
ISBN:	1601330006 9781601330000

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adam_text	AIMS SERIES ON APPLIED MATHEMATICS VOLUME 1 TRAFFIC FLOW ON NETWORKS CONSERVATION LAWS MODELS MAURO GARAVELLO AND BENEDETTO PICCOLI TECHNISCHE INFORMATIONSBIBLIOTHEK UNIVERSITATSBIBLIOTHEK HANNOVER AIMS AMERICAN INSTITUTE OF MATHEMATICAL SCIENCES CONTENTS 1 INTRODUCTION 1 1.1 BOOK CHAPTERS 7 2 CONSERVATION LAWS 9 2.1 BASIC DEFINITIONS 9 2.2 WEAK SOLUTIONS 10 2.3 ENTROPY ADMISSIBLE SOLUTIONS 16 2.3.1 SCALAR CASE 16 2.4 RIEMANN PROBLEM 17 2.4.1 THE NON-CONVEX SCALAR CASE 23 2.5 FUNCTIONS WITH BOUNDED VARIATION 26 2.5.1 BV FUNCTIONS IN RN 30 2.6 WAVE-FRONT TRACKING AND EXISTENCE OF SOLUTIONS 32 2.6.1 THE SCALAR CASE 32 2.6.2 THE SYSTEM CASE 37 2.7 UNIQUENESS AND CONTINUOUS DEPENDENCE 38 2.8 EXERCISES 43 2.9 BIBLIOGRAPHICAL NOTE 44 3 MACROSCOPIC TRAFFIC MODELS 47 3.1 LIGHTHILL-WHITHAM-RICHARDS MODEL 47 3.1.1 DERIVATION OF THE EQUATION 48 3.1.2 FUNDAMENTAL DIAGRAMS 48 3.1.3 RIEMANN PROBLEMS 49 3.1.4 THE NOT STRICTLY CONCAVE CASE 52 3.1.5 LIGHTHILL-WHITHAM-RICHARDS MODEL WITH VISCOSITY 53 3.2 PAYNE-WHITHAM MODEL 55 3.3 DRAWBACKS OF SECOND ORDER MODELS 56 3.4 AW-RASCLE MODEL 57 3.4.1 CHARACTERISTIC FIELDS 58 3.4.2 DOMAINS OF INVARIANCE 58 XIV CONTENTS 3.5 THIRD ORDER MODELS 60 3.6 HYPERBOLIC PHASE TRANSITION MODEL 61 3.6.1 THE RIEMARM PROBLEM 62 3.7 A MULTILANE MODEL 64 3.8 A MULTIPOPULATION MODEL 66 3.8.1 THE CASE N = 2 68 3.9 EXERCISES 69 3.10 BIBLIOGRAPHICAL NOTE 70 4 NETWORKS 71 4.1 BASIC DEFINITIONS AND ASSUMPTIONS 71 4.2 RIEMANN SOLVERS 72 4.3 WAVE-FRONT TRACKING 74 4.3.1 THE SCALAR CASE 74 4.3.2 RICH SYSTEMS 80 4.4 A CASE STUDY FOR RIEMANN SOLVERS 81 4.4.1 CONSTRUCTION OF RIEMANN SOLVERS 86 4.4.2 CASE OFX SINGLETON 91 4.4.3 ESTIMATES OF FLUX VARIATION 92 4.5 EXERCISES 93 4.6 OPEN PROBLEMS 94 5 LIGHTHIU-WHITHAM-RICHARDS MODEL ON NETWORKS 95 5.1 BASIC DEFINITIONS AND ASSUMPTIONS 95 5.2 THE RIEMANN PROBLEM AT JUNCTIONS 99 5.2.1 THE CASEN^M 100 5.2.2 THE CASE OF N ^ 2 INCOMING ROADS AND M * 1 OUTGOING ROAD 103 5.2.3 DEMAND-SUPPLY OF LEBACQUE 106 5.3 INTERACTION ESTIMATES 106 5.3.1 ESTIMATES ON THE NUMBER OF WAVES AND INTERACTIONS . .. 107 5.3.2 ESTIMATES ON FLUX TOTAL VARIATION 109 5.4 LIPSCHITZ CONTINUOUS DEPENDENCE ILL 5.5 TIME DEPENDENT TRAFFIC 115 5.6 TOTAL VARIATION OF THE FLUXES 117 5.7 TOTAL VARIATION OF THE DENSITIES 118 5.8 EXERCISES 119 5.9 BIBLIOGRAPHICAL NOTE 121 A.L TECHNICAL RESULTS 122 A.2 LIPSCHITZ DEPENDENCE IN A SPECIAL CASE 130 6 AW-RASCLE MODEL ON NETWORKS 133 6.1 BASIC DEFINITIONS AND ASSUMPTIONS 133 6.2 RIEMANN PROBLEMS AT JUNCTIONS 134 6.2.1 (AR-1): MAXIMIZE THE SPEED 141 CONTENTS XV 6.2.2 (AR-2): MAXIMIZE THE DENSITY 144 6.2.3 (AR-3): MINIMIZE THE TOTAL VARIATION 146 6.3 STABILITY OF SOLUTIONS TO RIEMANN PROBLEMS AT JUNCTIONS 147 6.3.1 (AR-1): MAXIMIZE THE SPEED 148 6.3.2 (AR-2): MAXIMIZE THE DENSITY 151 6.3.3 (AR-3): MINIMIZE THE TOTAL VARIATION 153 6.4 EXISTENCE OF SOLUTIONS TO A CAUCHY PROBLEM 155 6.5 OPEN PROBLEMS 158 6.6 BIBLIOGRAPHICAL NOTE 158 7 SOURCE DESTINATION MODEL 161 7.1 BASIC DEFINITIONS 161 7.1.1 TRAFFIC DISTRIBUTION AT JUNCTIONS 162 7.1.2 EVOLUTION EQUATIONS FOR TRAFFIC-TYPE FUNCTIONS 164 7.1.3 ADMISSIBLE NETWORKS AND SOLUTIONS 165 7.2 THE RIEMANN PROBLEM 166 7.2.1 JUNCTIONS WITH TWO INCOMING AND TWO OUTGOING ROADS . 170 7.3 WAVE-FRONT TRACKING ALGORITHM 173 7.4 BASIC ESTIMATES OF INTERACTIONS 173 7.4.1 INTERACTIONS OF TYPE T2 175 7.4.2 INTERACTIONS OF TYPE T4 178 7.4.3 INTERACTIONS OF TYPE T5 180 7.5 PERTURBATIONS OF AN EQUILIBRIUM 183 7.6 OPEN PROBLEMS 184 7.7 BIBLIOGRAPHICAL NOTE 185 8 AN EXAMPLE OF TRAFFIC REGULATION: CIRCLES VS LIGHTS 187 8.1 FLUX CONTROL FOR TRAFFIC LIGHTS 188 8.1.1 NOTATIONS AND POSITION OF THE CONTROL PROBLEM 188 8.1.2 ANALYSIS OF BACKWARD SHOCK WAVES ON THE INCOMING R.OADS 189 8.1.3 ASYMPTOTIC REGIME FOR THE OUTGOING ROADS 190 8.2 SINGLE LANE TRAFFIC CIRCLE WITH LOW TRAFFIC 191 8.3 SINGLE LANE TRAFFIC CIRCLE WITH HEAVY TRAFFIC 193 8.4 MULTI LANE TRAFFIC CIRCLE WITH NO INTERACTION 197 8.5 TRAFFIC LIGHT VS TRAFFIC CIRCLE 198 8.5.1 LOW TRAFFIC 199 8.5.2 HEAVY TRAFFIC 199 8.5.3 COMPARISON 200 9 TELECOMMUNICATION NETWORKS (BY C. D APICE AND R. MANZO) 201 9.1 INTRODUCTION 201 9.2 PACKETS LOSS AND VELOCITY FUNCTIONS ON TRANSMISSION LINES ... 203 9.3 RIEMANN SOLVER AT NODES 206 XVI CONTENTS 9.4 ESTIMATES ON DENSITY VARIATION 210 9.5 UNIQUENESS AND LIPSCHITZ CONTINUOUS DEPENDENCE 215 10 NUMERICS ON NETWORKS 217 10.1 NUMERICAL APPROXIMATION 217 10.1.1 GODUNOV SCHEME 217 10.1.2 KINETIC METHOD FOR A BOUNDARY VALUE PROBLEM 218 10.1.3 BOUNDARY CONDITIONS AND CONDITIONS AT JUNCTIONS 221 10.2 EXAMPLES . 224 10.2.1 BOTTLENECK 224 10.2.2 TRAFFIC CIRCLE 225 10.3 TESTS 225 10.3.1 BOTTLENECK 226 10.3.2 TRAFFIC CIRCLE 229 REFERENCES 235 INDEX 241
adam_txt	AIMS SERIES ON APPLIED MATHEMATICS VOLUME 1 TRAFFIC FLOW ON NETWORKS CONSERVATION LAWS MODELS MAURO GARAVELLO AND BENEDETTO PICCOLI TECHNISCHE INFORMATIONSBIBLIOTHEK UNIVERSITATSBIBLIOTHEK HANNOVER AIMS AMERICAN INSTITUTE OF MATHEMATICAL SCIENCES CONTENTS 1 INTRODUCTION 1 1.1 BOOK CHAPTERS 7 2 CONSERVATION LAWS 9 2.1 BASIC DEFINITIONS 9 2.2 WEAK SOLUTIONS 10 2.3 ENTROPY ADMISSIBLE SOLUTIONS 16 2.3.1 SCALAR CASE 16 2.4 RIEMANN PROBLEM 17 2.4.1 THE NON-CONVEX SCALAR CASE 23 2.5 FUNCTIONS WITH BOUNDED VARIATION 26 2.5.1 BV FUNCTIONS IN RN 30 2.6 WAVE-FRONT TRACKING AND EXISTENCE OF SOLUTIONS 32 2.6.1 THE SCALAR CASE 32 2.6.2 THE SYSTEM CASE 37 2.7 UNIQUENESS AND CONTINUOUS DEPENDENCE 38 2.8 EXERCISES 43 2.9 BIBLIOGRAPHICAL NOTE 44 3 MACROSCOPIC TRAFFIC MODELS 47 3.1 LIGHTHILL-WHITHAM-RICHARDS MODEL 47 3.1.1 DERIVATION OF THE EQUATION 48 3.1.2 FUNDAMENTAL DIAGRAMS 48 3.1.3 RIEMANN PROBLEMS 49 3.1.4 THE NOT STRICTLY CONCAVE CASE 52 3.1.5 LIGHTHILL-WHITHAM-RICHARDS MODEL WITH VISCOSITY 53 3.2 PAYNE-WHITHAM MODEL 55 3.3 DRAWBACKS OF SECOND ORDER MODELS 56 3.4 AW-RASCLE MODEL 57 3.4.1 CHARACTERISTIC FIELDS 58 3.4.2 DOMAINS OF INVARIANCE 58 XIV CONTENTS 3.5 THIRD ORDER MODELS 60 3.6 HYPERBOLIC PHASE TRANSITION MODEL 61 3.6.1 THE RIEMARM PROBLEM 62 3.7 A MULTILANE MODEL 64 3.8 A MULTIPOPULATION MODEL 66 3.8.1 THE CASE N = 2 68 3.9 EXERCISES 69 3.10 BIBLIOGRAPHICAL NOTE 70 4 NETWORKS 71 4.1 BASIC DEFINITIONS AND ASSUMPTIONS 71 4.2 RIEMANN SOLVERS 72 4.3 WAVE-FRONT TRACKING 74 4.3.1 THE SCALAR CASE 74 4.3.2 RICH SYSTEMS 80 4.4 A CASE STUDY FOR RIEMANN SOLVERS 81 4.4.1 CONSTRUCTION OF RIEMANN SOLVERS 86 4.4.2 CASE OFX SINGLETON 91 4.4.3 ESTIMATES OF FLUX VARIATION 92 4.5 EXERCISES 93 4.6 OPEN PROBLEMS 94 5 LIGHTHIU-WHITHAM-RICHARDS MODEL ON NETWORKS 95 5.1 BASIC DEFINITIONS AND ASSUMPTIONS 95 5.2 THE RIEMANN PROBLEM AT JUNCTIONS 99 5.2.1 THE CASEN^M 100 5.2.2 THE CASE OF N ^ 2 INCOMING ROADS AND M * 1 OUTGOING ROAD 103 5.2.3 DEMAND-SUPPLY OF LEBACQUE 106 5.3 INTERACTION ESTIMATES 106 5.3.1 ESTIMATES ON THE NUMBER OF WAVES AND INTERACTIONS . . 107 5.3.2 ESTIMATES ON FLUX TOTAL VARIATION 109 5.4 LIPSCHITZ CONTINUOUS DEPENDENCE ILL 5.5 TIME DEPENDENT TRAFFIC 115 5.6 TOTAL VARIATION OF THE FLUXES 117 5.7 TOTAL VARIATION OF THE DENSITIES 118 5.8 EXERCISES 119 5.9 BIBLIOGRAPHICAL NOTE 121 A.L TECHNICAL RESULTS 122 A.2 LIPSCHITZ DEPENDENCE IN A SPECIAL CASE 130 6 AW-RASCLE MODEL ON NETWORKS 133 6.1 BASIC DEFINITIONS AND ASSUMPTIONS 133 6.2 RIEMANN PROBLEMS AT JUNCTIONS 134 6.2.1 (AR-1): MAXIMIZE THE SPEED 141 CONTENTS XV 6.2.2 (AR-2): MAXIMIZE THE DENSITY 144 6.2.3 (AR-3): MINIMIZE THE TOTAL VARIATION 146 6.3 STABILITY OF SOLUTIONS TO RIEMANN PROBLEMS AT JUNCTIONS 147 6.3.1 (AR-1): MAXIMIZE THE SPEED 148 6.3.2 (AR-2): MAXIMIZE THE DENSITY 151 6.3.3 (AR-3): MINIMIZE THE TOTAL VARIATION 153 6.4 EXISTENCE OF SOLUTIONS TO A CAUCHY PROBLEM 155 6.5 OPEN PROBLEMS 158 6.6 BIBLIOGRAPHICAL NOTE 158 7 SOURCE DESTINATION MODEL 161 7.1 BASIC DEFINITIONS 161 7.1.1 TRAFFIC DISTRIBUTION AT JUNCTIONS 162 7.1.2 EVOLUTION EQUATIONS FOR TRAFFIC-TYPE FUNCTIONS 164 7.1.3 ADMISSIBLE NETWORKS AND SOLUTIONS 165 7.2 THE RIEMANN PROBLEM 166 7.2.1 JUNCTIONS WITH TWO INCOMING AND TWO OUTGOING ROADS . 170 7.3 WAVE-FRONT TRACKING ALGORITHM 173 7.4 BASIC ESTIMATES OF INTERACTIONS 173 7.4.1 INTERACTIONS OF TYPE T2 175 7.4.2 INTERACTIONS OF TYPE T4 178 7.4.3 INTERACTIONS OF TYPE T5 180 7.5 PERTURBATIONS OF AN EQUILIBRIUM 183 7.6 OPEN PROBLEMS 184 7.7 BIBLIOGRAPHICAL NOTE 185 8 AN EXAMPLE OF TRAFFIC REGULATION: CIRCLES VS LIGHTS 187 8.1 FLUX CONTROL FOR TRAFFIC LIGHTS 188 8.1.1 NOTATIONS AND POSITION OF THE CONTROL PROBLEM 188 8.1.2 ANALYSIS OF BACKWARD SHOCK WAVES ON THE INCOMING R.OADS 189 8.1.3 ASYMPTOTIC REGIME FOR THE OUTGOING ROADS 190 8.2 SINGLE LANE TRAFFIC CIRCLE WITH LOW TRAFFIC 191 8.3 SINGLE LANE TRAFFIC CIRCLE WITH HEAVY TRAFFIC 193 8.4 MULTI LANE TRAFFIC CIRCLE WITH NO INTERACTION 197 8.5 TRAFFIC LIGHT VS TRAFFIC CIRCLE 198 8.5.1 LOW TRAFFIC 199 8.5.2 HEAVY TRAFFIC 199 8.5.3 COMPARISON 200 9 TELECOMMUNICATION NETWORKS (BY C. D'APICE AND R. MANZO) 201 9.1 INTRODUCTION 201 9.2 PACKETS LOSS AND VELOCITY FUNCTIONS ON TRANSMISSION LINES . 203 9.3 RIEMANN SOLVER AT NODES 206 XVI CONTENTS 9.4 ESTIMATES ON DENSITY VARIATION 210 9.5 UNIQUENESS AND LIPSCHITZ CONTINUOUS DEPENDENCE 215 10 NUMERICS ON NETWORKS 217 10.1 NUMERICAL APPROXIMATION 217 10.1.1 GODUNOV SCHEME 217 10.1.2 KINETIC METHOD FOR A BOUNDARY VALUE PROBLEM 218 10.1.3 BOUNDARY CONDITIONS AND CONDITIONS AT JUNCTIONS 221 10.2 EXAMPLES '. 224 10.2.1 BOTTLENECK 224 10.2.2 TRAFFIC CIRCLE 225 10.3 TESTS 225 10.3.1 BOTTLENECK 226 10.3.2 TRAFFIC CIRCLE 229 REFERENCES 235 INDEX 241
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spelling	Garavello, Mauro Verfasser aut Traffic flow on networks conservation laws models Mauro Garavallo and Benedetto Piccoli Springfield, Mo. American Inst. of Math. Sciences 2006 XVI, 243 S. graph. Darst. txt rdacontent n rdamedia nc rdacarrier AIMS series on applied mathematics 1 Mathematisches Modell Conservation laws (Mathematics) Traffic flow Mathematical models Verkehrsnetz (DE-588)4062953-3 gnd rswk-swf Mathematisches Modell (DE-588)4114528-8 gnd rswk-swf Verkehrsablauf (DE-588)4062902-8 gnd rswk-swf Verkehrsnetz (DE-588)4062953-3 s Verkehrsablauf (DE-588)4062902-8 s Mathematisches Modell (DE-588)4114528-8 s DE-604 Piccoli, Benedetto Verfasser aut AIMS series on applied mathematics 1 (DE-604)BV023094684 1 GBV Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=014918600&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Garavello, Mauro Piccoli, Benedetto Traffic flow on networks conservation laws models AIMS series on applied mathematics Mathematisches Modell Conservation laws (Mathematics) Traffic flow Mathematical models Verkehrsnetz (DE-588)4062953-3 gnd Mathematisches Modell (DE-588)4114528-8 gnd Verkehrsablauf (DE-588)4062902-8 gnd
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title	Traffic flow on networks conservation laws models
title_auth	Traffic flow on networks conservation laws models
title_exact_search	Traffic flow on networks conservation laws models
title_exact_search_txtP	Traffic flow on networks conservation laws models
title_full	Traffic flow on networks conservation laws models Mauro Garavallo and Benedetto Piccoli
title_fullStr	Traffic flow on networks conservation laws models Mauro Garavallo and Benedetto Piccoli
title_full_unstemmed	Traffic flow on networks conservation laws models Mauro Garavallo and Benedetto Piccoli
title_short	Traffic flow on networks
title_sort	traffic flow on networks conservation laws models
title_sub	conservation laws models
topic	Mathematisches Modell Conservation laws (Mathematics) Traffic flow Mathematical models Verkehrsnetz (DE-588)4062953-3 gnd Mathematisches Modell (DE-588)4114528-8 gnd Verkehrsablauf (DE-588)4062902-8 gnd
topic_facet	Mathematisches Modell Conservation laws (Mathematics) Traffic flow Mathematical models Verkehrsnetz Verkehrsablauf
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=014918600&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV023094684
work_keys_str_mv	AT garavellomauro trafficflowonnetworksconservationlawsmodels AT piccolibenedetto trafficflowonnetworksconservationlawsmodels

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