Sabine Hering: Hyperbolic Partial Differential Equations : Theory, Numerics and Applications - neues Buch
2001, ISBN: 9783322802279
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-… Mehr…
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-Harburg in Germany.This type of meeting is originally funded by the Volkswa- genstiftung in Hannover (Germany) with the aim to bring together well-known leading experts from special mathematical, physical and engineering fields of interest with PhD- students, members of Scientific Research Institutes as well as people from Industry, in order to learn and discuss modern theoretical and numerical developments.Hyperbolic partial differential equations play an important role in various applications from natural sciences and engineering.Starting from the classical Euler equations in fluid dynamics, several other hyperbolic equations arise in traffic flow problems, acoustics, radiation transfer, crystal growth etc.The main interest is concerned with nonlinear hyperbolic problems and the special structures, which are characteristic for solutions of these equations, like shock and rarefaction waves as well as entropy solutions.As a consequence, even numerical schemes for hyperbolic equations differ significantly from methods for elliptic and parabolic equations: the transport of information runs along the characteristic curves of a hyperbolic equation and consequently the direction of transport is of constitutive importance.This property leads to the construction of upwind schemes and the theory of Riemann solvers.Both concepts are combined with explicit or implicit time stepping techniques whereby the chosen order of accuracy usually depends on the expected dynamic of the underlying solution.; PDF; Scientific, Technical and Medical > Mathematics, VS Verlag fur Sozialwissenschaften<
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Jochen Schneider: Hyperbolic Partial Differential Equations : Theory, Numerics and Applications - neues Buch
2001, ISBN: 9783322802279
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-… Mehr…
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-Harburg in Germany.This type of meeting is originally funded by the Volkswa- genstiftung in Hannover (Germany) with the aim to bring together well-known leading experts from special mathematical, physical and engineering fields of interest with PhD- students, members of Scientific Research Institutes as well as people from Industry, in order to learn and discuss modern theoretical and numerical developments.Hyperbolic partial differential equations play an important role in various applications from natural sciences and engineering.Starting from the classical Euler equations in fluid dynamics, several other hyperbolic equations arise in traffic flow problems, acoustics, radiation transfer, crystal growth etc.The main interest is concerned with nonlinear hyperbolic problems and the special structures, which are characteristic for solutions of these equations, like shock and rarefaction waves as well as entropy solutions.As a consequence, even numerical schemes for hyperbolic equations differ significantly from methods for elliptic and parabolic equations: the transport of information runs along the characteristic curves of a hyperbolic equation and consequently the direction of transport is of constitutive importance.This property leads to the construction of upwind schemes and the theory of Riemann solvers.Both concepts are combined with explicit or implicit time stepping techniques whereby the chosen order of accuracy usually depends on the expected dynamic of the underlying solution.; PDF; Scientific, Technical and Medical > Mathematics, Deutscher Universitatsverlag<
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No. 9783322802279. Versandkosten:Instock, Despatched same working day before 3pm, zzgl. Versandkosten. Details...
(*) Derzeit vergriffen bedeutet, dass dieser Titel momentan auf keiner der angeschlossenen Plattform verfügbar ist.
Stefan Felsner: Hyperbolic Partial Differential Equations : Theory, Numerics and Applications - neues Buch
2001, ISBN: 9783322802279
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-… Mehr…
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-Harburg in Germany.This type of meeting is originally funded by the Volkswa- genstiftung in Hannover (Germany) with the aim to bring together well-known leading experts from special mathematical, physical and engineering fields of interest with PhD- students, members of Scientific Research Institutes as well as people from Industry, in order to learn and discuss modern theoretical and numerical developments.Hyperbolic partial differential equations play an important role in various applications from natural sciences and engineering.Starting from the classical Euler equations in fluid dynamics, several other hyperbolic equations arise in traffic flow problems, acoustics, radiation transfer, crystal growth etc.The main interest is concerned with nonlinear hyperbolic problems and the special structures, which are characteristic for solutions of these equations, like shock and rarefaction waves as well as entropy solutions.As a consequence, even numerical schemes for hyperbolic equations differ significantly from methods for elliptic and parabolic equations: the transport of information runs along the characteristic curves of a hyperbolic equation and consequently the direction of transport is of constitutive importance.This property leads to the construction of upwind schemes and the theory of Riemann solvers.Both concepts are combined with explicit or implicit time stepping techniques whereby the chosen order of accuracy usually depends on the expected dynamic of the underlying solution.; PDF; Scientific, Technical and Medical > Mathematics, Vieweg+Teubner Verlag<
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No. 9783322802279. Versandkosten:Instock, Despatched same working day before 3pm, zzgl. Versandkosten. Details...
(*) Derzeit vergriffen bedeutet, dass dieser Titel momentan auf keiner der angeschlossenen Plattform verfügbar ist.
Hyperbolic Partial Differential Equations : Theory, Numerics and Applications - neues Buch
2001, ISBN: 9783322802279
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-… Mehr…
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-Harburg in Germany.This type of meeting is originally funded by the Volkswa- genstiftung in Hannover (Germany) with the aim to bring together well-known leading experts from special mathematical, physical and engineering fields of interest with PhD- students, members of Scientific Research Institutes as well as people from Industry, in order to learn and discuss modern theoretical and numerical developments.Hyperbolic partial differential equations play an important role in various applications from natural sciences and engineering.Starting from the classical Euler equations in fluid dynamics, several other hyperbolic equations arise in traffic flow problems, acoustics, radiation transfer, crystal growth etc.The main interest is concerned with nonlinear hyperbolic problems and the special structures, which are characteristic for solutions of these equations, like shock and rarefaction waves as well as entropy solutions.As a consequence, even numerical schemes for hyperbolic equations differ significantly from methods for elliptic and parabolic equations: the transport of information runs along the characteristic curves of a hyperbolic equation and consequently the direction of transport is of constitutive importance.This property leads to the construction of upwind schemes and the theory of Riemann solvers.Both concepts are combined with explicit or implicit time stepping techniques whereby the chosen order of accuracy usually depends on the expected dynamic of the underlying solution.; PDF; Scientific, Technical and Medical > Mathematics, VS Verlag fur Sozialwissenschaften<
No. 9783322802279. Versandkosten:Instock, Despatched same working day before 3pm, zzgl. Versandkosten.
Hyperbolic Partial Differential Equations : Theory, Numerics and Applications - neues Buch
2001, ISBN: 9783322802279
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-… Mehr…
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-Harburg in Germany.This type of meeting is originally funded by the Volkswa- genstiftung in Hannover (Germany) with the aim to bring together well-known leading experts from special mathematical, physical and engineering fields of interest with PhD- students, members of Scientific Research Institutes as well as people from Industry, in order to learn and discuss modern theoretical and numerical developments.Hyperbolic partial differential equations play an important role in various applications from natural sciences and engineering.Starting from the classical Euler equations in fluid dynamics, several other hyperbolic equations arise in traffic flow problems, acoustics, radiation transfer, crystal growth etc.The main interest is concerned with nonlinear hyperbolic problems and the special structures, which are characteristic for solutions of these equations, like shock and rarefaction waves as well as entropy solutions.As a consequence, even numerical schemes for hyperbolic equations differ significantly from methods for elliptic and parabolic equations: the transport of information runs along the characteristic curves of a hyperbolic equation and consequently the direction of transport is of constitutive importance.This property leads to the construction of upwind schemes and the theory of Riemann solvers.Both concepts are combined with explicit or implicit time stepping techniques whereby the chosen order of accuracy usually depends on the expected dynamic of the underlying solution.; PDF; Scientific, Technical and Medical > Mathematics, Deutscher Universitatsverlag<
No. 9783322802279. Versandkosten:Instock, Despatched same working day before 3pm, zzgl. Versandkosten.
Stefan Felsner: Hyperbolic Partial Differential Equations : Theory, Numerics and Applications - neues Buch
2001
ISBN: 9783322802279
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-… Mehr…
The following chapters summarize lectures given in March 2001 during the summerschool on Hyperbolic Partial Differential Equations which took place at the Technical University of Hamburg-Harburg in Germany.This type of meeting is originally funded by the Volkswa- genstiftung in Hannover (Germany) with the aim to bring together well-known leading experts from special mathematical, physical and engineering fields of interest with PhD- students, members of Scientific Research Institutes as well as people from Industry, in order to learn and discuss modern theoretical and numerical developments.Hyperbolic partial differential equations play an important role in various applications from natural sciences and engineering.Starting from the classical Euler equations in fluid dynamics, several other hyperbolic equations arise in traffic flow problems, acoustics, radiation transfer, crystal growth etc.The main interest is concerned with nonlinear hyperbolic problems and the special structures, which are characteristic for solutions of these equations, like shock and rarefaction waves as well as entropy solutions.As a consequence, even numerical schemes for hyperbolic equations differ significantly from methods for elliptic and parabolic equations: the transport of information runs along the characteristic curves of a hyperbolic equation and consequently the direction of transport is of constitutive importance.This property leads to the construction of upwind schemes and the theory of Riemann solvers.Both concepts are combined with explicit or implicit time stepping techniques whereby the chosen order of accuracy usually depends on the expected dynamic of the underlying solution.; PDF; Scientific, Technical and Medical > Mathematics, Vieweg+Teubner Verlag<
No. 9783322802279. Versandkosten:Instock, Despatched same working day before 3pm, zzgl. Versandkosten.
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Buch in der Datenbank seit 2017-05-10T18:07:50+02:00 (Vienna) Detailseite zuletzt geändert am 2023-04-16T15:56:13+02:00 (Vienna) ISBN/EAN: 9783322802279
ISBN - alternative Schreibweisen: 978-3-322-80227-9 Alternative Schreibweisen und verwandte Suchbegriffe: Autor des Buches: meister andreas Titel des Buches: hyperbolic, differential equations applications, partial differential equations
Daten vom Verlag:
Autor/in: Andreas Meister; Jens Struckmeier Titel: Hyperbolic Partial Differential Equations - Theory, Numerics and Applications Verlag: Vieweg+Teubner Verlag; Vieweg & Teubner 320 Seiten Erscheinungsjahr: 2012-12-06 Wiesbaden; DE Sprache: Englisch 39,99 € (DE) 41,20 € (AT) 47,50 CHF (CH) Available XII, 320 p.
Hyperbolic Conservation Laws and Industrial Applications - Central Schemes and Systems of Balance Laws - Methods on Unstructured Grids, WENO and ENO Recovery techniques - Pressure-Correction Methods for all Flow Speeds - Computational Fluid Dynamics and Aeroacoustics for Low Mach Number Flow Neben einer Einführung in die fundamentalen Eigenschaften hyperbolischer Differentialgleichungen und Ihrer Entstehung bei der Modellierung unterschiedlicher praxisrelevanter Problemstellungen stellen die Verfasser in diesem Lehrbuch Konzepte numerischer Methoden und Analysis von den Grundlagen bis zu den neuesten Entwicklungen in einer eingängigen Form vor. Hierbei werden zentrale Verfahren wie auch Upwind-Methoden auf strukturierten und unstrukturierten Gitter basierend auf ENO- und WENO-Rekonstruktionstechniken diskutiert und neben Druckkorrekturverfahren wie bespielsweise SIMPLE und PISO auch asymptotisch-basierte Algorithmen für Strömungen kleiner Mach-Zahl vorgestellt. Die Themen haben praktische Anwendungen in Technik und Physik.
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