The Resource From hyperbolic systems to kinetic theory : a personalized quest, Luc Tartar
From hyperbolic systems to kinetic theory : a personalized quest, Luc Tartar
Resource Information
The item From hyperbolic systems to kinetic theory : a personalized quest, Luc Tartar represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Missouri Libraries.This item is available to borrow from 1 library branch.
Resource Information
The item From hyperbolic systems to kinetic theory : a personalized quest, Luc Tartar represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Missouri Libraries.
This item is available to borrow from 1 library branch.
 Extent
 xxvii, 279 pages
 Contents

 The
 Burgers equation: special solutions
 The
 Burgers equation: small perturbations; the Heat equation
 Fourier transform; the asymptotic behaviour for the Heat equation
 Radon measures; the law of large numbers
 A
 1D model with characteristic speed 1/
 A
 2D generalization; the PerronFrobenius theory
 Preface  Historical perspective
 A
 general finitedimensional model with characteristic speed 1/
 Discrete velocity models
 The
 MimuraNishida and the CrandallTartar existence theorems
 Systems satisfying my condition (S)
 Asymptotic estimates for the Broadwell and the Carleman models
 Oscillating solutions; the 2D Broadwell model
 Oscillating solutions; the Carleman model
 The
 Hyperbolic systems: Riemann invariants, rarefaction waves
 Carleman model: asymptotic behaviour
 Oscillating solutions: the Broadwell model
 Generalized invariant regions; the Varadhan estimate
 Hyperbolic systems: contact discontinuities, shocks
 The
 Burgers equation and the 1D scalar case
 The
 1D scalar case: the econditions of Lax and of Oleinik
 Hopf's formulation of the econditions of Oleinik
 The
 IllnerShinbrot and the Hamdache existence theorems
 The
 Hilbert expansion
 Conpactness by integration
 Wave front sets; Hmeasures
 Hmeasures and "idealized particles"
 Variants of Hmeasures
 Questioning physics; from classical particles to balance laws
 Balance laws; what are forces?
 D. Bernoulli: from Masslets and Springs to the 1D wave equation
 Cauchy: from Masslets and Springs to the 2D linearized elasticity
 The
 twobody problem
 The
 Boltzmann equation
 Isbn
 9783540775614
 Label
 From hyperbolic systems to kinetic theory : a personalized quest
 Title
 From hyperbolic systems to kinetic theory
 Title remainder
 a personalized quest
 Statement of responsibility
 Luc Tartar
 Language
 eng
 Cataloging source
 YDXCP
 http://library.link/vocab/creatorName
 Tartar, Luc
 Index
 index present
 Literary form
 non fiction
 Nature of contents
 bibliography
 http://library.link/vocab/relatedWorkOrContributorName
 Unione matematica italiana
 Series statement
 Lecture notes of the Unione Matematica Italiana,
 Series volume
 6
 http://library.link/vocab/subjectName

 Continuum mechanics
 Differential equations, Hyperbolic
 Kinetic theory of gases
 Dynamics
 Mathematical physics
 Label
 From hyperbolic systems to kinetic theory : a personalized quest, Luc Tartar
 Bibliography note
 Includes bibliographical references (pages [275]276) and index
 Carrier category
 volume
 Carrier category code

 nc
 Carrier MARC source
 rdacarrier
 Content category
 text
 Content type code

 txt
 Content type MARC source
 rdacontent
 Contents

 The
 Burgers equation: special solutions
 The
 Burgers equation: small perturbations; the Heat equation
 Fourier transform; the asymptotic behaviour for the Heat equation
 Radon measures; the law of large numbers
 A
 1D model with characteristic speed 1/
 A
 2D generalization; the PerronFrobenius theory
 Preface  Historical perspective
 A
 general finitedimensional model with characteristic speed 1/
 Discrete velocity models
 The
 MimuraNishida and the CrandallTartar existence theorems
 Systems satisfying my condition (S)
 Asymptotic estimates for the Broadwell and the Carleman models
 Oscillating solutions; the 2D Broadwell model
 Oscillating solutions; the Carleman model
 The
 Hyperbolic systems: Riemann invariants, rarefaction waves
 Carleman model: asymptotic behaviour
 Oscillating solutions: the Broadwell model
 Generalized invariant regions; the Varadhan estimate
 Hyperbolic systems: contact discontinuities, shocks
 The
 Burgers equation and the 1D scalar case
 The
 1D scalar case: the econditions of Lax and of Oleinik
 Hopf's formulation of the econditions of Oleinik
 The
 IllnerShinbrot and the Hamdache existence theorems
 The
 Hilbert expansion
 Conpactness by integration
 Wave front sets; Hmeasures
 Hmeasures and "idealized particles"
 Variants of Hmeasures
 Questioning physics; from classical particles to balance laws
 Balance laws; what are forces?
 D. Bernoulli: from Masslets and Springs to the 1D wave equation
 Cauchy: from Masslets and Springs to the 2D linearized elasticity
 The
 twobody problem
 The
 Boltzmann equation
 Control code
 209333412
 Dimensions
 24 cm
 Extent
 xxvii, 279 pages
 Isbn
 9783540775614
 Lccn
 2007942545
 Media category
 unmediated
 Media MARC source
 rdamedia
 Media type code

 n
 System control number
 (OCoLC)209333412
 Label
 From hyperbolic systems to kinetic theory : a personalized quest, Luc Tartar
 Bibliography note
 Includes bibliographical references (pages [275]276) and index
 Carrier category
 volume
 Carrier category code

 nc
 Carrier MARC source
 rdacarrier
 Content category
 text
 Content type code

 txt
 Content type MARC source
 rdacontent
 Contents

 The
 Burgers equation: special solutions
 The
 Burgers equation: small perturbations; the Heat equation
 Fourier transform; the asymptotic behaviour for the Heat equation
 Radon measures; the law of large numbers
 A
 1D model with characteristic speed 1/
 A
 2D generalization; the PerronFrobenius theory
 Preface  Historical perspective
 A
 general finitedimensional model with characteristic speed 1/
 Discrete velocity models
 The
 MimuraNishida and the CrandallTartar existence theorems
 Systems satisfying my condition (S)
 Asymptotic estimates for the Broadwell and the Carleman models
 Oscillating solutions; the 2D Broadwell model
 Oscillating solutions; the Carleman model
 The
 Hyperbolic systems: Riemann invariants, rarefaction waves
 Carleman model: asymptotic behaviour
 Oscillating solutions: the Broadwell model
 Generalized invariant regions; the Varadhan estimate
 Hyperbolic systems: contact discontinuities, shocks
 The
 Burgers equation and the 1D scalar case
 The
 1D scalar case: the econditions of Lax and of Oleinik
 Hopf's formulation of the econditions of Oleinik
 The
 IllnerShinbrot and the Hamdache existence theorems
 The
 Hilbert expansion
 Conpactness by integration
 Wave front sets; Hmeasures
 Hmeasures and "idealized particles"
 Variants of Hmeasures
 Questioning physics; from classical particles to balance laws
 Balance laws; what are forces?
 D. Bernoulli: from Masslets and Springs to the 1D wave equation
 Cauchy: from Masslets and Springs to the 2D linearized elasticity
 The
 twobody problem
 The
 Boltzmann equation
 Control code
 209333412
 Dimensions
 24 cm
 Extent
 xxvii, 279 pages
 Isbn
 9783540775614
 Lccn
 2007942545
 Media category
 unmediated
 Media MARC source
 rdamedia
 Media type code

 n
 System control number
 (OCoLC)209333412
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