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Collection Encyclopaedia of Mathematical Sciences
- Editeur : Springer-Verlag
- ISSN : pas d'ISSN
Documents disponibles dans la collection
Affiner la recherche Interroger des sources externesProbability theory Vol. III / Yu. V. Prokhorov
Titre : Probability theory Vol. III : stochastic calculus Type de document : texte imprimé Auteurs : Yu. V. Prokhorov, Auteur ; A. N. Shiryaev, Auteur ; P. B. Slater, Traducteur Editeur : New York : Springer-Verlag Année de publication : 1998 Collection : Encyclopaedia of Mathematical Sciences Importance : 253 p. Présentation : couv. ill. en coul. Format : 24 cm. ISBN/ISSN/EAN : 978-3-540-54687-1 Langues : Anglais (eng) Index. décimale : 04-05 Probabilité et statistique Résumé : This volume of the Encyclopaedia is a survey of stochastic calculus which has become an increasingly important part of probability. The topics covered include Brownian motion, the Ito integral, stochastic differential equations and Malliavin calculus, the general theory of random processes and martingale theory. The five authors are well-known experts in the field. The first chapter of the book is an introduction which treats Brownian motion and describes the developments which lead to the definition of Ito's integral. The book addresses graduate students and researchers in probability theory and mathematical statistics and will also be used by physicists and engineers who need to apply stochastic methods. Note de contenu : Contents
Chapter 1 Introduction to Stochastic Calculus
Chapter 2 Stochastic Differential and Evolution Equations
I Stochastic Differential Equations (SDEs)
II Stochastic Evolution Equations
III Stochastic Calculus (Malliavin Calculus). Applications to Stochastic Differential Equations
Chapter 3 Stochastic Calculus on Filtered Probability Spaces
I Elements of the General Theory of Stochastic Processes
II Semimartingales. Stochastic Integrals
III Absolute Continuity and Singularity of Probability Distributions
Chapter 4 Martingales and Limit Theorems for Stochastic Processes
I Theory: Weak Convergence of Probability Measures on Metric Spaces
II Applications: The Invariance Principle and Diffusion Approximation
Author Index
Subject IndexProbability theory Vol. III : stochastic calculus [texte imprimé] / Yu. V. Prokhorov, Auteur ; A. N. Shiryaev, Auteur ; P. B. Slater, Traducteur . - New York : Springer-Verlag, 1998 . - 253 p. : couv. ill. en coul. ; 24 cm.. - (Encyclopaedia of Mathematical Sciences) .
ISSN : 978-3-540-54687-1
Langues : Anglais (eng)
Index. décimale : 04-05 Probabilité et statistique Résumé : This volume of the Encyclopaedia is a survey of stochastic calculus which has become an increasingly important part of probability. The topics covered include Brownian motion, the Ito integral, stochastic differential equations and Malliavin calculus, the general theory of random processes and martingale theory. The five authors are well-known experts in the field. The first chapter of the book is an introduction which treats Brownian motion and describes the developments which lead to the definition of Ito's integral. The book addresses graduate students and researchers in probability theory and mathematical statistics and will also be used by physicists and engineers who need to apply stochastic methods. Note de contenu : Contents
Chapter 1 Introduction to Stochastic Calculus
Chapter 2 Stochastic Differential and Evolution Equations
I Stochastic Differential Equations (SDEs)
II Stochastic Evolution Equations
III Stochastic Calculus (Malliavin Calculus). Applications to Stochastic Differential Equations
Chapter 3 Stochastic Calculus on Filtered Probability Spaces
I Elements of the General Theory of Stochastic Processes
II Semimartingales. Stochastic Integrals
III Absolute Continuity and Singularity of Probability Distributions
Chapter 4 Martingales and Limit Theorems for Stochastic Processes
I Theory: Weak Convergence of Probability Measures on Metric Spaces
II Applications: The Invariance Principle and Diffusion Approximation
Author Index
Subject IndexExemplaires
Code-barres Cote Support Localisation Section Disponibilité N.Inventaire 500 04-05-04 Livre Bibliothèque de Génie Electrique- USTO Documentaires Exclu du prêt 500
Titre : Partial differential equations Vol. IV : microlocal analysis and hyperbolic equations Type de document : texte imprimé Auteurs : Yu. V. Egorov, Auteur ; M. A. Shubin, Auteur Editeur : New York : Springer-Verlag Année de publication : 1993 Collection : Encyclopaedia of Mathematical Sciences Importance : 241 p. Présentation : couv. ill. en coul. Format : 24 cm. ISBN/ISSN/EAN : 978-3-540-53363-4 Langues : Anglais (eng) Index. décimale : 04-01 Mathématiques générales Résumé : In the first part of this EMS volume Yu.V. Egorov gives an account of microlocal analysis as a tool for investigating partial differential equations. This method has become increasingly important in the theory of Hamiltonian systems. Egorov discusses the evolution of singularities of a partial differential equation and covers topics like integral curves of Hamiltonian systems, pseudodifferential equations and canonical transformations, subelliptic operators and Poisson brackets. The second survey written by V.Ya. Ivrii treats linear hyperbolic equations and systems. The author states necessary and sufficient conditions for C?- and L2 -well-posedness and he studies the analogous problem in the context of Gevrey classes. He also gives the latest results in the theory of mixed problems for hyperbolic operators and a list of unsolved problems. Both parts cover recent research in an important field, which before was scattered in numerous journals. The book will hence be of immense value to graduate students and researchers in partial differential equations and theoretical physics. Note de contenu : Contents
Chapter 1 Microlocal properties of distributions
Chapter 2 Pseudodifferential operators
Chapter 3 Fourier integral operators
Chapter 4 The propagation of singularities
Chapter 5 Solvability of (pseudo) differntial équations
Chapter 6 Smoothness of solutions of differential équations
Chapter 7 Transformation of boundary-value problems
Chapter 8 HyperfunctionsPartial differential equations Vol. IV : microlocal analysis and hyperbolic equations [texte imprimé] / Yu. V. Egorov, Auteur ; M. A. Shubin, Auteur . - New York : Springer-Verlag, 1993 . - 241 p. : couv. ill. en coul. ; 24 cm.. - (Encyclopaedia of Mathematical Sciences) .
ISBN : 978-3-540-53363-4
Langues : Anglais (eng)
Index. décimale : 04-01 Mathématiques générales Résumé : In the first part of this EMS volume Yu.V. Egorov gives an account of microlocal analysis as a tool for investigating partial differential equations. This method has become increasingly important in the theory of Hamiltonian systems. Egorov discusses the evolution of singularities of a partial differential equation and covers topics like integral curves of Hamiltonian systems, pseudodifferential equations and canonical transformations, subelliptic operators and Poisson brackets. The second survey written by V.Ya. Ivrii treats linear hyperbolic equations and systems. The author states necessary and sufficient conditions for C?- and L2 -well-posedness and he studies the analogous problem in the context of Gevrey classes. He also gives the latest results in the theory of mixed problems for hyperbolic operators and a list of unsolved problems. Both parts cover recent research in an important field, which before was scattered in numerous journals. The book will hence be of immense value to graduate students and researchers in partial differential equations and theoretical physics. Note de contenu : Contents
Chapter 1 Microlocal properties of distributions
Chapter 2 Pseudodifferential operators
Chapter 3 Fourier integral operators
Chapter 4 The propagation of singularities
Chapter 5 Solvability of (pseudo) differntial équations
Chapter 6 Smoothness of solutions of differential équations
Chapter 7 Transformation of boundary-value problems
Chapter 8 HyperfunctionsExemplaires
Code-barres Cote Support Localisation Section Disponibilité N.Inventaire 130 04-01-10 Livre Bibliothèque de Génie Electrique- USTO Documentaires Exclu du prêt 130
Titre : Partial differential equations Vol. VI : elliptic and parabolic operators Type de document : texte imprimé Auteurs : Yu. V. Egorov, Auteur ; M. A. Shubin, Auteur Editeur : New York : Springer-Verlag Année de publication : 1994 Collection : Encyclopaedia of Mathematical Sciences Importance : 325 p. Présentation : couv. ill. en coul. Format : 24 cm. ISBN/ISSN/EAN : 978-3-540-54678-2 Langues : Anglais (eng) Index. décimale : 04-01 Mathématiques générales Résumé : Authored by well-known researchers, this book presents its material as accessible surveys, giving readers access to comprehensive coverage of results scattered throughout the literature. A unique source of information for graduate students and researchers in mathematics and theoretical physics, and engineers interested in the subject. Note de contenu : Contents
I. Elliptic Operators on Closed Manifolds.
II. Degenerate Elliptic Equations and Boundary Problems.
III. Parabolic Equations.
Author Index.Partial differential equations Vol. VI : elliptic and parabolic operators [texte imprimé] / Yu. V. Egorov, Auteur ; M. A. Shubin, Auteur . - New York : Springer-Verlag, 1994 . - 325 p. : couv. ill. en coul. ; 24 cm.. - (Encyclopaedia of Mathematical Sciences) .
ISSN : 978-3-540-54678-2
Langues : Anglais (eng)
Index. décimale : 04-01 Mathématiques générales Résumé : Authored by well-known researchers, this book presents its material as accessible surveys, giving readers access to comprehensive coverage of results scattered throughout the literature. A unique source of information for graduate students and researchers in mathematics and theoretical physics, and engineers interested in the subject. Note de contenu : Contents
I. Elliptic Operators on Closed Manifolds.
II. Degenerate Elliptic Equations and Boundary Problems.
III. Parabolic Equations.
Author Index.Exemplaires
Code-barres Cote Support Localisation Section Disponibilité N.Inventaire 129 04-01-11 Livre Bibliothèque de Génie Electrique- USTO Documentaires Exclu du prêt 129
Titre : Several complex variables Vol. VII : sheaf-theoretical methods in complex analysis Type de document : texte imprimé Auteurs : H. Grauert, Auteur ; TH. Paternell, Auteur ; R. Remmert, Auteur Editeur : New York : Springer-Verlag Année de publication : 1994 Collection : Encyclopaedia of Mathematical Sciences Importance : 369 p. Présentation : couv. ill. en coul. Format : 24 cm. ISBN/ISSN/EAN : 978-3-540-56259-1 Langues : Anglais (eng) Index. décimale : 04-01 Mathématiques générales Résumé : This book offers a systématic introduction to and a comprehensive survey of yhe theory of complex aspaces. the first two chapters cover the founations, then topics as cohomology of complex spaces, analytic and meromorphic decompositions of coplex spaces,the levi problem and vanishing theorems, q-convex and q-convex spaces and bimeromorphic geometry are treated. finally cycle spaces and extension theorems are discussed.this volume is the first survey of the theory of complex spaces and includes various historical remarks.
It will be useful to graduate students and reseearchers in complex analysis, algebraic geoltry and differential geometry. also mathematical physicists interested in these fields will find the volume useful.Note de contenu : Contents
Introduction
Chapter I. Local Theory of Complex Spaces
Chapter II. Differential Calculus, Holomorphic Maps and Linear Structures on Complex Spaces
Chapter III. Cohomology
Chapter IV. Seminormal Complex Spaces
Chapter V. Pseudoconvexity, the Levi Problem and Vanishing Theorems
Chapter VI. Theory of q-Convesity and q-Concavity
Chapter VII. Modifications
Chapter VIII. Cycle Spaces
Chapter IX. Extensions of Analytic Objects
Author Index
Subject IndexSeveral complex variables Vol. VII : sheaf-theoretical methods in complex analysis [texte imprimé] / H. Grauert, Auteur ; TH. Paternell, Auteur ; R. Remmert, Auteur . - New York : Springer-Verlag, 1994 . - 369 p. : couv. ill. en coul. ; 24 cm.. - (Encyclopaedia of Mathematical Sciences) .
ISSN : 978-3-540-56259-1
Langues : Anglais (eng)
Index. décimale : 04-01 Mathématiques générales Résumé : This book offers a systématic introduction to and a comprehensive survey of yhe theory of complex aspaces. the first two chapters cover the founations, then topics as cohomology of complex spaces, analytic and meromorphic decompositions of coplex spaces,the levi problem and vanishing theorems, q-convex and q-convex spaces and bimeromorphic geometry are treated. finally cycle spaces and extension theorems are discussed.this volume is the first survey of the theory of complex spaces and includes various historical remarks.
It will be useful to graduate students and reseearchers in complex analysis, algebraic geoltry and differential geometry. also mathematical physicists interested in these fields will find the volume useful.Note de contenu : Contents
Introduction
Chapter I. Local Theory of Complex Spaces
Chapter II. Differential Calculus, Holomorphic Maps and Linear Structures on Complex Spaces
Chapter III. Cohomology
Chapter IV. Seminormal Complex Spaces
Chapter V. Pseudoconvexity, the Levi Problem and Vanishing Theorems
Chapter VI. Theory of q-Convesity and q-Concavity
Chapter VII. Modifications
Chapter VIII. Cycle Spaces
Chapter IX. Extensions of Analytic Objects
Author Index
Subject IndexExemplaires
Code-barres Cote Support Localisation Section Disponibilité N.Inventaire 131 04-01-12 Livre Bibliothèque de Génie Electrique- USTO Documentaires Exclu du prêt 131
