Verfügbarkeit: Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations

Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations:

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Bibliographische Detailangaben
1. Verfasser:	Kanbar, Farah (VerfasserIn)
Format:	Abschlussarbeit Buch
Sprache:	English
Veröffentlicht:	Würzburg Würzburg University Press [2023]
Schlagworte:	Angewandte Mathematik Hyperbolische Differentialgleichung Kinetische Gleichung Euler-Lagrange-Gleichung Magnetohydrodynamische Gleichung Euler equations isentropic Euler equations MHD equations kinetic equations well-balanced scheme asymptotic preserving stationary preserving hyperbolic partial differential equations Hochschulschrift
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	xiv, 137 Seiten Illustrationen, Diagramme
ISBN:	9783958262102 3958262104 9783958262119

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MARC


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Datensatz im Suchindex

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adam_text	CONTENTS ACKNOWLEDGMENTS V PREFACE VII ABSTRACT IX ABBREVIATIONS XI 1 INTRODUCTION 1 2 WELL-BALANCED CENTRAL SCHEMES WITH THE SUBTRACTION METHOD 5 2.1 INTRODUCTION ..................................................................................................... 5 2.2 1 D UNSTAGGERED WELL-BALANCED FV CENTRAL SCHEME ....................................... 5 2.3 2D UNSTAGGERED WELL-BALANCED FV CENTRAL SCHEME ....................................... 13 2.4 TVD PROPERTY OF THE SCHEME APPLIED TO SCALAR CONSERVATION LAW ............... 19 2.5 NUMERICAL RESULTS ......................................................................................... 23 2.5.1 APPLICATION TO THE 1 D EULER SYSTEM WITH GRAVITATIONAL SOURCE TERM ... 23 2.5.2 APPLICATION TO THE 2D EULER SYSTEM WITH GRAVITATIONAL SOURCE TERM ... 26 2.5.3 APPLICATION TO THE 2D MHD EQUATIONS WITH GRAVITATIONAL SOURCE TERM . . 29 2.5.4 MHD WAVE PROPAGATION-WEAK MAGNETIC FIELD ............................. 37 2.6 CONCLUSION .................................................................................................... 38 3 AP AND SP SCHEMES FOR KINETIC EQUATIONS 61 3.1 INTRODUCTION ..................................................................................................... 61 3.2 PARITY EQUATIONS-BASED SCHEME FOR THE NEUTRON TRANSPORT EQUATION ............... 62 3.2.1 THE NEUTRON TRANSPORT EQUATION ........................................................... 62 3.2.2 DISCRETIZATION OF THE MODEL ................................................................. 62 3.2.3 SP PROPERTY ......................................................................................... 64 3.2.4 NUMERICAL RESULTS ................................................................................ 66 3.3 UGKS SCHEME FOR THE CHEMOTAXIS KINETIC MODEL ............................................. 66 3.3.1 THE CHEMOTAXIS KINETIC MODEL ........................................................... 67 3.3.2 DISCRETIZATION OF THE MODEL ................................................................. 67 3.3.3 SP PROPERTY ......................................................................................... 70 3.3.4 NUMERICAL RESULTS ................................................................................ 71 3.4 IMEX SCHEME WITH THE PENALIZATION METHOD FOR THE BOLTZMANN EQUATION . . . 72 3.4.1 THE BOLTZMANN EQUATION .................................................................... 72 3.4.2 IMEX SCHEME WITH THE PENALIZATION METHOD ...................................... 73 3.4.3 SP PROPERTY ......................................................................................... 73 3.4.4 NUMERICAL RESULTS ................................................................................ 74 3.5 CONCLUSION ..................................................................................................... 75 4 AP AND SP SCHEMES FOR THE ISENTROPIC EULER EQUATIONS WITH GRAVITY 83 4.1 INTRODUCTION ....................................................................................................... 83 4.2 THE ISENTROPIC EULER EQUATIONS WITH GRAVITY .................................................... 83 4.2.1 THE MODEL ............................................................................................ 83 4.2.2 SCALING .................................................................................................. 83 4.2.3 THE INCOMPRESSIBLE LIMIT EQUATIONS ........................................................ 85 4.3 SEMI-DISCRETE NUMERICAL SCHEME ................................................................... 86 4.3.1 THE SCHEME ........................................................................................... 86 4.3.2 THE AP PROPERTY .................................................................................. 87 4.4 FULLY DISCRETE NUMERICAL SCHEME ................................................................... 91 4.4.1 THE 1D NUMERICAL SCHEME ................................................................... 92 4.4.2 THE 2D NUMERICAL SCHEME ................................................................... 95 4.4.3 THE AP PROPERTY FOR THE 2D NUMERICAL SCHEME ....................................... 103 4.4.4 THE SP PROPERTY OF THE 2D NUMERICAL SCHEME ........................................ 107 4.5 NUMERICAL RESULTS ............................................................................................ 107 4.5.1 1D TEST CASES .......................................................................................... 108 4.5.2 2D TEST CASES .......................................................................................... 110 4.6 CONCLUSION ........................................................................................................ 114 5 CONCLUSION AND FUTURE WORK 125 6 APPENDICES 127 BIBLIOGRAPHY 131
adam_txt	CONTENTS ACKNOWLEDGMENTS V PREFACE VII ABSTRACT IX ABBREVIATIONS XI 1 INTRODUCTION 1 2 WELL-BALANCED CENTRAL SCHEMES WITH THE SUBTRACTION METHOD 5 2.1 INTRODUCTION . 5 2.2 1 D UNSTAGGERED WELL-BALANCED FV CENTRAL SCHEME . 5 2.3 2D UNSTAGGERED WELL-BALANCED FV CENTRAL SCHEME . 13 2.4 TVD PROPERTY OF THE SCHEME APPLIED TO SCALAR CONSERVATION LAW . 19 2.5 NUMERICAL RESULTS . 23 2.5.1 APPLICATION TO THE 1 D EULER SYSTEM WITH GRAVITATIONAL SOURCE TERM . 23 2.5.2 APPLICATION TO THE 2D EULER SYSTEM WITH GRAVITATIONAL SOURCE TERM . 26 2.5.3 APPLICATION TO THE 2D MHD EQUATIONS WITH GRAVITATIONAL SOURCE TERM . . 29 2.5.4 MHD WAVE PROPAGATION-WEAK MAGNETIC FIELD . 37 2.6 CONCLUSION . 38 3 AP AND SP SCHEMES FOR KINETIC EQUATIONS 61 3.1 INTRODUCTION . 61 3.2 PARITY EQUATIONS-BASED SCHEME FOR THE NEUTRON TRANSPORT EQUATION . 62 3.2.1 THE NEUTRON TRANSPORT EQUATION . 62 3.2.2 DISCRETIZATION OF THE MODEL . 62 3.2.3 SP PROPERTY . 64 3.2.4 NUMERICAL RESULTS . 66 3.3 UGKS SCHEME FOR THE CHEMOTAXIS KINETIC MODEL . 66 3.3.1 THE CHEMOTAXIS KINETIC MODEL . 67 3.3.2 DISCRETIZATION OF THE MODEL . 67 3.3.3 SP PROPERTY . 70 3.3.4 NUMERICAL RESULTS . 71 3.4 IMEX SCHEME WITH THE PENALIZATION METHOD FOR THE BOLTZMANN EQUATION . . . 72 3.4.1 THE BOLTZMANN EQUATION . 72 3.4.2 IMEX SCHEME WITH THE PENALIZATION METHOD . 73 3.4.3 SP PROPERTY . 73 3.4.4 NUMERICAL RESULTS . 74 3.5 CONCLUSION . 75 4 AP AND SP SCHEMES FOR THE ISENTROPIC EULER EQUATIONS WITH GRAVITY 83 4.1 INTRODUCTION . 83 4.2 THE ISENTROPIC EULER EQUATIONS WITH GRAVITY . 83 4.2.1 THE MODEL . 83 4.2.2 SCALING . 83 4.2.3 THE INCOMPRESSIBLE LIMIT EQUATIONS . 85 4.3 SEMI-DISCRETE NUMERICAL SCHEME . 86 4.3.1 THE SCHEME . 86 4.3.2 THE AP PROPERTY . 87 4.4 FULLY DISCRETE NUMERICAL SCHEME . 91 4.4.1 THE 1D NUMERICAL SCHEME . 92 4.4.2 THE 2D NUMERICAL SCHEME . 95 4.4.3 THE AP PROPERTY FOR THE 2D NUMERICAL SCHEME . 103 4.4.4 THE SP PROPERTY OF THE 2D NUMERICAL SCHEME . 107 4.5 NUMERICAL RESULTS . 107 4.5.1 1D TEST CASES . 108 4.5.2 2D TEST CASES . 110 4.6 CONCLUSION . 114 5 CONCLUSION AND FUTURE WORK 125 6 APPENDICES 127 BIBLIOGRAPHY 131
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spelling	Kanbar, Farah Verfasser (DE-588)1289546029 aut Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations Farah Kanbar Würzburg Würzburg University Press [2023] © 2023 xiv, 137 Seiten Illustrationen, Diagramme txt rdacontent n rdamedia nc rdacarrier Dissertation Würzburg, Julius-Maximilians-Universität Würzburg 2022 Angewandte Mathematik Hyperbolische Differentialgleichung Kinetische Gleichung Euler-Lagrange-Gleichung Magnetohydrodynamische Gleichung Euler equations isentropic Euler equations MHD equations kinetic equations well-balanced scheme asymptotic preserving stationary preserving hyperbolic partial differential equations (DE-588)4113937-9 Hochschulschrift gnd-content Würzburg University Press (DE-588)1068107367 pbl Erscheint auch als Online-Ausgabe, PDF Kanbar, Farah Asymptotic and Stationary Preserving Schemes for Kinetic and Hyperbolic Partial Differential Equations Würzburg : Würzburg University Press, 2023 978-3-95826-211-9 10.25972/WUP-978-3-95826-211-9 (DE-604)BV048963589 DNB Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=034295335&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis 1\p vlb 20230511 DE-101 https://d-nb.info/provenance/plan#vlb
spellingShingle	Kanbar, Farah Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations
subject_GND	(DE-588)4113937-9
title	Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations
title_auth	Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations
title_exact_search	Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations
title_exact_search_txtP	Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations
title_full	Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations Farah Kanbar
title_fullStr	Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations Farah Kanbar
title_full_unstemmed	Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations Farah Kanbar
title_short	Asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations
title_sort	asymptotic and stationary preserving schemes for kinetic and hyperbolic partial differential equations
topic_facet	Hochschulschrift
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=034295335&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
work_keys_str_mv	AT kanbarfarah asymptoticandstationarypreservingschemesforkineticandhyperbolicpartialdifferentialequations AT wurzburguniversitypress asymptoticandstationarypreservingschemesforkineticandhyperbolicpartialdifferentialequations

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