A. B Katok - Search - Anna’s Archive

duxiu/initial_release/a_40284580.zip

AMERICAN MATHEMATICAL SOCIETY TRANSLATIONS SERIES 2 VOLUME 16 THREE PAPERS ON DYNAMICAL SYSTEMS A.G.KUSNIRENKO,A.B.KATOK,V.M.ALEKSEEV, by A.G. Kusnirenko, A.B. Katok, V.M. Alekseev, V. M Alekseev, A. G Kushnirenko, A. B Katok, A. G Kusnirenko, A. B Katok, V. M Alekseev, A. G. Kushnirenko, A. G Kušnirenko American Mathematical Society, 1981, 1981

Problems In The General Theory Of Dynamical Systems On A Manifold / A.g. Kusnirenko -- Dynamical Systems With Hyperbolic Structure / A.b. Katok -- Quasirandom Oscillations And Qualitative Questions In Celestial Mechanics / V.m. Alekseev. By A.g. Kusnirenko, A.b. Katok, V.m. Alekseev. Includes Bibliographical References.

English [en] · PDF · 55.4MB · 1981 · 📗 Book (unknown) · 🚀/duxiu/zlibzh · Save

lgli/D:\HDD4\_missing\3ac5ed0433d800efd8d5eb2bd8d39042.pdf

Rigidity in Higher Rank Abelian Group Actions: Volume 1, Introduction and Cocycle Problem (Cambridge Tracts in Mathematics, Series Number 185) Anatole Katok, Viorel Niţică Cambridge University Press (Virtual Publishing), Cambridge tracts in mathematics -- 185-, Cambridge tracts in mathematics -- 185-, Cambridge, UK, New York, England, 2011

"This self-contained monograph presents rigidity theory for a large class of dynamical systems, differentiable higher rank hyperbolic and partially hyperbolic actions. This first volume describes the subject in detail and develops the principal methods presently used in various aspects of the rigidity theory. Part I serves as an exposition and preparation, including a large collection of examples that are difficult to find in the existing literature. Part II focuses on cocycle rigidity, which serves as a model for rigidity phenomena as well as a useful tool for studying them. The book is an ideal reference for applied mathematicians and scientists working in dynamical systems and a useful introduction for graduate students interested in entering the field. Its wealth of examples also makes it excellent supplementary reading for any introductory course in dynamical systems"-- "In a very general sense modern theory of smooth dynamical systems deals with smooth actions of "sufficiently large but not too large" groups or semigroups (usually locally compact but not compact) on a "sufficiently small" phase space (usually compact, or, sometimes, finite volume manifolds). Important branches of dynamics specifically consider actions preserving a geometric structure with an infinite-dimensional group of automorphisms, two principal examples being a volume and a symplectic structure. The natural equivalence relation for actions is differentiable (corr. volume preserving or symplectic) conjugacy"--

English [en] · PDF · 3.2MB · 2011 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

upload/newsarch_ebooks/2019/05/17/0521879094_Rigidity.pdf

Rigidity in Higher Rank Abelian Group Actions: Volume 1, Introduction and Cocycle Problem (Cambridge Tracts in Mathematics, Series Number 185) Anatole Katok, Viorel Nitica Cambridge University Press (Virtual Publishing), Cambridge tracts in mathematics -- 185-, Cambridge tracts in mathematics -- 185-, Cambridge, UK, New York, England, 2011

"This self-contained monograph presents rigidity theory for a large class of dynamical systems, differentiable higher rank hyperbolic and partially hyperbolic actions. This first volume describes the subject in detail and develops the principal methods presently used in various aspects of the rigidity theory. Part I serves as an exposition and preparation, including a large collection of examples that are difficult to find in the existing literature. Part II focuses on cocycle rigidity, which serves as a model for rigidity phenomena as well as a useful tool for studying them. The book is an ideal reference for applied mathematicians and scientists working in dynamical systems and a useful introduction for graduate students interested in entering the field. Its wealth of examples also makes it excellent supplementary reading for any introductory course in dynamical systems"-- "In a very general sense modern theory of smooth dynamical systems deals with smooth actions of "sufficiently large but not too large" groups or semigroups (usually locally compact but not compact) on a "sufficiently small" phase space (usually compact, or, sometimes, finite volume manifolds). Important branches of dynamics specifically consider actions preserving a geometric structure with an infinite-dimensional group of automorphisms, two principal examples being a volume and a symplectic structure. The natural equivalence relation for actions is differentiable (corr. volume preserving or symplectic) conjugacy"--

English [en] · PDF · 1.9MB · 2011 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/upload/zlib · Save

duxiu/initial_release/a_40399743.zip

Modern dynamical systems and applications : dedicated to Anatole Katok on his 60th birthday A. B Katok, Michael Brin, Boris Hasselblatt, Ya B Pesin, edited by Michael Brin, Boris Hasselblatt, Yakov Pesin, Michael Brin, Boris Hasselblatt, Yakov B Pesin, Michael Brin, Boris Hasselblatt, Anatole Katok, Michael Brin, Boris Hasselblatt, Pesin, Ya. B Cambridge University Press (Virtual Publishing), 2004, 2004

This volume presents a wide cross section of current research in the theory of dynamical systems and contains articles by leading researchers, including several Fields medalists, in a variety of specialties. These are surveys, usually with new results included, as well as research papers that are included because of their potentially high impact. Major areas covered include hyperbolic dynamics, elliptic dynamics, mechanics, geometry, ergodic theory, group actions, rigidity, applications. The target audience includes dynamicists, who will find new results in their own specialty as well as surveys in others, and mathematicians from other disciplines who look for a sample of current developments in ergodic theory and dynamical systems. (Midwest) Presenting a wide cross-section of current research in the theory of dynamical systems, this collection consists of articles by leading researchers (and several Fields medallists) in a variety of specialties. Surveys featuring new results, as well as research papers, are included because of their potentially high impact. Major areas covered include hyperbolic dynamics, elliptic dynamics, mechanics, geometry, ergodic theory, group actions, rigidity, and applications. The target audience is dynamicists, as well as mathematicians from other disciplines.

English [en] · PDF · 141.4MB · 2004 · 📗 Book (unknown) · 🚀/duxiu/zlibzh · Save

Your ad here.

nexusstc/Handbook of Dynamical Systems, Volume 3/ba18c76d432153caa5e9107987102eef.pdf

Handbook of Dynamical Systems, Volume 3 3 edited by H. Broer, F. Takens and B. Hasselblatt N.H. North Holland, Handbook of Dynamical Systems, 3, 1, 2010

In this volume, the authors present a collection of surveys on various aspects of the theory of bifurcations of differentiable dynamical systems and related topics. By selecting these subjects, they focus on those developments from which research will be active in the coming years. The surveys are intended to educate the reader on the recent literature on the following subjects: transversality and generic properties like the various forms of the so-called Kupka-Smale theorem, the Closing Lemma and generic local bifurcations of functions (so-called catastrophe theory) and generic local bifurcations in 1-parameter families of dynamical systems, and notions of structural stability and moduli. Covers recent literature on various topics related to the theory of birfurcations of differentiable dynamical systems Highlights developments that are the foundation for future research in this field Provides material in the form of surveys which are important tools for introducing the birfucations of differentiable dynamical systems.

English [en] · PDF · 9.9MB · 2010 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/1874575X/1/part/PA

Handbook of Dynamical Systems 1, Part A B. Hasselblatt and A. Katok (Eds.) North Holland; Elsevier, Handbook of Dynamical Systems 1, Part A, 1, 2002

Volumes 1A and 1B. These volumes give a comprehensive survey of dynamics written by specialists in the various subfields of dynamical systems. The presentation attains coherence through a major introductory survey by the editors that organizes the entire subject, and by ample cross-references between individual surveys. The volumes are a valuable resource for dynamicists seeking to acquaint themselves with other specialties in the field, and to mathematicians active in other branches of mathematics who wish to learn about contemporary ideas and results dynamics. Assuming only general mathematical knowledge the surveys lead the reader towards the current state of research in dynamics. Volume 1B will appear 2005.

English [en] · PDF · 58.9MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/zlib · Save

lgli/Handbook of dynamical systems, Vol.2 (NH, 2002)(ISBN 0444501681)(T)(O)(1096s)_PD_.djvu

Handbook of Dynamical Systems (Volume 2) B. Fiedler (editor) North Holland; Elsevier, 1st ed., Amsterdam, New York, Netherlands, 2002

This handbook is volume II in a series collecting mathematical state-of-the-art surveys in the field of dynamical systems. Much of this field has developed from interactions with other areas of science, and this volume shows how concepts of dynamical systems further the understanding of mathematical issues that arise in applications. Although modeling issues are addressed, the central theme is the mathematically rigorous investigation of the resulting differential equations and their dynamic behavior. However, the authors and editors have made an effort to ensure readability on a non-technical level for mathematicians from other fields and for other scientists and engineers. The eighteen surveys collected here do not aspire to encyclopedic completeness, but present selected paradigms. The surveys are grouped into those emphasizing finite-dimensional methods, numerics, topological methods, and partial differential equations. Application areas include the dynamics of neural networks, fluid flows, nonlinear optics, and many others. While the survey articles can be read independently, they deeply share recurrent themes from dynamical systems. Attractors, bifurcations, center manifolds, dimension reduction, ergodicity, homoclinicity, hyperbolicity, invariant and inertial manifolds, normal forms, recurrence, shift dynamics, stability, to name just a few, are ubiquitous dynamical concepts throughout the articles.

English [en] · DJVU · 7.1MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs · Save

lgli/1874575X/1/part/PB

Handbook of Dynamical Systems 1, Part B B. Hasselblatt and A. Katok (Eds.) Elsevier Science, Handbook of Dynamical Systems 1, Part B, 1, 2006

This second half of Volume 1 of this Handbook follows Volume 1A, which was published in 2002. The contents of these two tightly integrated parts taken together come close to a realization of the program formulated in the introductory survey "Principal Structures” of Volume 1A. The present volume contains surveys on subjects in four areas of dynamical systems: Hyperbolic dynamics, parabolic dynamics, ergodic theory and infinite-dimensional dynamical systems (partial differential equations). . Written by experts in the field. . The coverage of ergodic theory in these two parts of Volume 1 is considerably more broad and thorough than that provided in other existing sources. . The final cluster of chapters discusses partial differential equations from the point of view of dynamical systems

English [en] · PDF · 8.7MB · 2006 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/zlib · Save

lgli/D:\HDD4\!genesis\SPR_NEW_2013-12\bok%3A978-1-4899-6696-4.pdf

Ergodic Theory and Dynamical Systems I: Proceedings Special Year, Maryland 1979–80 (Progress in Mathematics, 10) Daniel J. Rudolph (auth.), A. Katok (eds.) Birkhäuser Boston : Imprint: Birkhäuser, Progress in Mathematics, Progress in Mathematics 10, 1, 1981

Progress in Mathematics Erscheinungsdatum: 02.10.2013

English [en] · PDF · 6.4MB · 1981 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/scihub/zlib · Save

Your ad here.

lgli/76/M_Mathematics/MD_Geometry and topology/MDdg_Differential geometry/Katok A., Climenhaga V. Lectures on surfaces (STML046, AMS, 2008)(ISBN 9780821846797)(O)(307s)_MDdg_.pdf

Lectures on Surfaces: Almost Everything You Wanted to Know About Them (Student Mathematical Library) Anatole Katok and Vaughn Climenhaga American Mathematical Society ; Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library 046, 2008

Surfaces are among the most common and easily visualized mathematical objects, and their study brings into focus fundamental ideas, concepts, and methods from geometry, topology, complex analysis, Morse theory, and group theory. At the same time, many of those notions appear in a technically simpler and more graphic form than in their general ``natural'' settings. The first, primarily expository, chapter introduces many of the principal actors--the round sphere, flat torus, Mobius strip, Klein bottle, elliptic plane, etc.--as well as various methods of describing surfaces, beginning with the traditional representation by equations in three-dimensional space, proceeding to parametric representation, and also introducing the less intuitive, but central for our purposes, representation as factor spaces. It concludes with a preliminary discussion of the metric geometry of surfaces, and the associated isometry groups. Subsequent chapters introduce fundamental mathematical structures--topological, combinatorial (piecewise linear), smooth, Riemannian (metric), and complex--in the specific context of surfaces. The focal point of the book is the Euler characteristic, which appears in many different guises and ties together concepts from combinatorics, algebraic topology, Morse theory, ordinary differential equations, and Riemannian geometry. The repeated appearance of the Euler characteristic provides both a unifying theme and a powerful illustration of the notion of an invariant in all those theories. The assumed background is the standard calculus sequence, some linear algebra, and rudiments of ODE and real analysis. All notions are introduced and discussed, and virtually all results proved, based on this background. This book is a result of the MASS course in geometry in the fall semester of 2007.

English [en] · PDF · 10.2MB · 2008 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/76/M_Mathematics/MP_Mathematical physics/MPd_Dynamical systems/Katok A. Combinatorial constructions in ergodic theory and dynamics (ULECT030, AMS, 2003)(ISBN 0821834967)(600dpi)(T)(O)(127s)_MPd_.djvu

Combinatorial Constructions In Ergodic Theory And Dynamics (university Lecture Series) Anatole Katok American Mathematical Society, University Lecture Series, University lecture series (Providence, R.I.), 30, 2003

Ergodic theory studies measure-preserving transformations of measure spaces. These objects are intrinsically infinite, and the notion of an individual point or of an orbit makes no sense. Still there are a variety of situations when a measure-preserving transformation (and its asymptotic behavior) can be well described as a limit of certain finite objects (periodic processes). The first part of this book develops this idea systematically. Genericity of approximation in various categories is explored, and numerous applications are presented, including spectral multiplicity and properties of the maximal spectral type.The second part of the book contains a treatment of various constructions of cohomological nature with an emphasis on obtaining interesting asymptotic behavior from approximate pictures at different time scales. The book presents a view of ergodic theory not found in other expository sources. It is suitable for graduate students familiar with measure theory and basic functional analysis

English [en] · DJVU · 1.2MB · 2003 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/P_Physics/PD_Dynamical systems/Hasselblatt B., Katok A. A first course in dynamics (CUP, 2003)(ISBN 0521583047)(O)(435s)_PD_.pdf

A first course in dynamics : with a panorama of recent developments Boris Hasselblatt; Anatole Katok Cambridge University Press (Virtual Publishing), 1, US, 2003

The Theory Of Dynamical Systems Is A Major Mathematical Discipline Closely Intertwined With All Main Areas Of Mathematics. It Has Greatly Stimulated Research In Many Sciences And Given Rise To The Vast New Area Variously Called Applied Dynamics, Nonlinear Science, Or Chaos Theory. This Introduction For Senior Undergraduate And Beginning Graduate Students Of Mathematics, Physics, And Engineering Combines Mathematical Rigor With Copious Examples Of Important Applications. It Covers The Central Topological And Probabilistic Notions In Dynamics Ranging From Newtonian Mechanics To Coding Theory. Readers Need Not Be Familiar With Manifolds Or Measure Theory; The Only Prerequisite Is A Basic Undergraduate Analysis Course. The Authors Begin By Describing The Wide Array Of Scientific And Mathematical Questions That Dynamics Can Address. They Then Use A Progression Of Examples To Present The Concepts And Tools For Describing Asymptotic Behavior In Dynamical Systems, Gradually Increasing The Level Of Complexity. The Final Chapters Introduce Modern Developments And Applications Of Dynamics. Subjects Include Contractions, Logistic Maps, Equidistribution, Symbolic Dynamics, Mechanics, Hyperbolic Dynamics, Strange Attractors, Twist Maps, And Kam-theory.--pub. Desc. Pt. 1 A Course In Dynamics: From Simple To Complicated Behavior -- 2 Systems With Stable Asymptotic Behavior -- 3 Linear Maps And Linear Differential Equations -- 4 Recurrence And Equidistribution On The Circle -- 5 Recurrence And Equidistribution In Higher Dimension -- 6 Conservative Systems -- 7 Simple Systems With Complicated Orbit Structure -- 8 Entropy And Chaos -- Pt. 2 Panorama Of Dynamical Systems -- 9 Simple Dynamics As A Tool -- 10 Hyperbolic Dynamics -- 11 Quadratic Maps -- 12 Homoclinic Tangles -- 13 Strange Attractors -- 14 Variational Methods, Twist Maps, And Closed Geodesics -- 15 Dynamics, Number Theory, And Diophantine Approximatin. Boris Hasselblatt, Anatole Katok. Includes Bibliographical References And Index.

English [en] · PDF · 7.3MB · 2003 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/P_Physics/PD_Dynamical systems/Katok A., Hasselblatt B. Introduction to modern theory of dynamical systems (EMA054, CUP, 1996)(ISBN 0521341876)(900dpi)(T)(824s)_PD_.djvu

Introduction to the Modern Theory of Dynamical Systems (Encyclopedia of Mathematics and its Applications, Series Number 54) Anatole Katok, Boris Hasselblatt; with a supplement by Anatole Katok and Leonardo Mendoza Cambridge University Press (Virtual Publishing), Encyclopedia of mathematics and its applications ;, v. 54, Cambridge, New York, NY, USA, England, 1995

"This book provides the first self-contained comprehensive exposition of the theory of dynamical systems as a core mathematical discipline closely intertwined with most of the main areas of mathematics. The authors introduce and rigorously develop the theory while providing researchers interested in applications with fundamental tools and paradigms." "The book begins with a discussion of several elementary but fundamental examples. These are used to formulate a program for the general study of asymptotic properties and to introduce the principal theoretical concepts and methods. The main theme of the second part of the book is the interplay between local analysis near individual orbits and the global complexity of the orbits structure. The third and fourth parts develop in depth the theories of low-dimensional dynamical systems and hyperbolic dynamical systems." "The book is aimed at students and researchers in mathematics at all levels from advanced undergraduate up. Scientists and engineers working in applied dynamics, nonlinear science, and chaos will also find many fresh insights in this concrete and clear presentation. It contains more than four hundred systematic exercises."--BOOK JACKET

English [en] · DJVU · 8.7MB · 1995 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/scihub/zlib · Save

lgli/P_Physics/PD_Dynamical systems/Fiedler B. (ed.) Handbook of dynamical systems, Vol.2 (NH, 2002)(ISBN 0444501681)(T)(O)(1096s)_PD_.djvu

Handbook of Dynamical Systems (Volume 2) Bernold Fiedler North Holland; Elsevier, Handbook of Dynamical Systems, 2, 1, 2002

This handbook is volume II in a series collecting mathematical state-of-the-art surveys in the field of dynamical systems. Much of this field has developed from interactions with other areas of science, and this volume shows how concepts of dynamical systems further the understanding of mathematical issues that arise in applications. Although modeling issues are addressed, the central theme is the mathematically rigorous investigation of the resulting differential equations and their dynamic behavior. However, the authors and editors have made an effort to ensure readability on a non-technical level for mathematicians from other fields and for other scientists and engineers. The eighteen surveys collected here do not aspire to encyclopedic completeness, but present selected paradigms. The surveys are grouped into those emphasizing finite-dimensional methods, numerics, topological methods, and partial differential equations. Application areas include the dynamics of neural networks, fluid flows, nonlinear optics, and many others. While the survey articles can be read independently, they deeply share recurrent themes from dynamical systems. Attractors, bifurcations, center manifolds, dimension reduction, ergodicity, homoclinicity, hyperbolicity, invariant and inertial manifolds, normal forms, recurrence, shift dynamics, stability, to name just a few, are ubiquitous dynamical concepts throughout the articles. <br

English [en] · DJVU · 7.1MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

Your ad here.

nexusstc/Handbook of dynamical systems/45351012fa4e4f310099e67c456f6e36.pdf

Handbook of Dynamical Systems : Volume 2 Bernold Fiedler North Holland; Elsevier, Handbook of Dynamical Systems, 2, 1, 2002

This handbook is volume II in a series collecting mathematical state-of-the-art surveys in the field of dynamical systems. Much of this field has developed from interactions with other areas of science, and this volume shows how concepts of dynamical systems further the understanding of mathematical issues that arise in applications. Although modeling issues are addressed, the central theme is the mathematically rigorous investigation of the resulting differential equations and their dynamic behavior. However, the authors and editors have made an effort to ensure readability on a non-technical level for mathematicians from other fields and for other scientists and engineers. The eighteen surveys collected here do not aspire to encyclopedic completeness, but present selected paradigms. The surveys are grouped into those emphasizing finite-dimensional methods, numerics, topological methods, and partial differential equations. Application areas include the dynamics of neural networks, fluid flows, nonlinear optics, and many others. While the survey articles can be read independently, they deeply share recurrent themes from dynamical systems. Attractors, bifurcations, center manifolds, dimension reduction, ergodicity, homoclinicity, hyperbolicity, invariant and inertial manifolds, normal forms, recurrence, shift dynamics, stability, to name just a few, are ubiquitous dynamical concepts throughout the articles.

English [en] · PDF · 40.2MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/M_Mathematics/MP_Mathematical physics/MPd_Dynamical systems/Hasselblatt B., Katok A. (eds.) Handbook of dynamical systems, vol.1A (Elsevier, 2002)(ISBN 0444826696)(600dpi)(T)(O)(1229s)_MPd_.djvu

Handbook of Dynamical Systems (Volume 1A) Hasselblatt B., Katok A. (eds.) N.H. North Holland : Elsevier, Handbook of Dynamical Systems, Volume 1A, 1, 2002

Volumes 1A and 1B. These volumes give a comprehensive survey of dynamics written by specialists in the various subfields of dynamical systems. The presentation attains coherence through a major introductory survey by the editors that organizes the entire subject, and by ample cross-references between individual surveys. The volumes are a valuable resource for dynamicists seeking to acquaint themselves with other specialties in the field, and to mathematicians active in other branches of mathematics who wish to learn about contemporary ideas and results dynamics. Assuming only general mathematical knowledge the surveys lead the reader towards the current state of research in dynamics. Volume 1B will appear 2005.

English [en] · DJVU · 8.6MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

nexusstc/Handbook of dynamical systems/6c42ac1f617540b5e8f3d8b8fe8dbf20.pdf

Handbook of Dynamical Systems, Volume Volume 1A B. Hasselblatt, A. Katok, H. Broer, F. Takens N.H. North Holland : Elsevier, Handbook of Dynamical Systems, Volume 1A, 1, 2002

Volumes 1A and 1B. These volumes give a comprehensive survey of dynamics written by specialists in the various subfields of dynamical systems. The presentation attains coherence through a major introductory survey by the editors that organizes the entire subject, and by ample cross-references between individual surveys. The volumes are a valuable resource for dynamicists seeking to acquaint themselves with other specialties in the field, and to mathematicians active in other branches of mathematics who wish to learn about contemporary ideas and results dynamics. Assuming only general mathematical knowledge the surveys lead the reader towards the current state of research in dynamics. Volume 1B will appear 2005.

English [en] · PDF · 60.4MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/P_Physics/PD_Dynamical systems/Handbook of dynamical systems, Vol.1A (NH, 2002)(ISBN 0444826696)(T)(O)(1228s)_PD_.djvu

Handbook of Dynamical Systems (Volume 1A) B. Hasselblatt, A. Katok, H. Broer, F. Takens N.H. North Holland : Elsevier, Handbook of Dynamical Systems, Volume 1A, 1, 2002

Volumes 1A and 1B. These volumes give a comprehensive survey of dynamics written by specialists in the various subfields of dynamical systems. The presentation attains coherence through a major introductory survey by the editors that organizes the entire subject, and by ample cross-references between individual surveys. The volumes are a valuable resource for dynamicists seeking to acquaint themselves with other specialties in the field, and to mathematicians active in other branches of mathematics who wish to learn about contemporary ideas and results dynamics. Assuming only general mathematical knowledge the surveys lead the reader towards the current state of research in dynamics. Volume 1B will appear 2005.<br

English [en] · DJVU · 8.6MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

ia/isbn_3764330961.pdf

Ergodic Theory and Dynamical Systems II (Progress in Mathematics (Birkhauser Boston)) A. Katok, editor Birkhäuser Boston : Imprint : Birkhäuser, Progress in mathematics (Boston, Mass.), v. 10, 21, Boston, 1981-1982

A. Katok, Editor. Includes Index. Includes Bibliographies.

English [en] · PDF · 8.1MB · 1982 · 📗 Book (unknown) · 🚀/ia · Save

Your ad here.

ia/rigidityinhigher0000kato.pdf

Rigidity in Higher Rank Abelian Group Actions: Volume 1, Introduction and Cocycle Problem (Cambridge Tracts in Mathematics, Series Number 185) Anatole Katok; Viorel Niţică Cambridge, UK ; New York: Cambridge University Press, Cambridge University Press, Cambridge, 2011

v. ; 24 cm "This self-contained monograph presents rigidity theory for a large class of dynamical systems, differentiable higher rank hyperbolic and partially hyperbolic actions. This first volume describes the subject in detail and develops the principal methods presently used in various aspects of the rigidity theory. Part I serves as an exposition and preparation, including a large collection of examples that are difficult to find in the existing literature. Part II focuses on cocycle rigidity, which serves as a model for rigidity phenomena as well as a useful tool for studying them. The book is an ideal reference for applied mathematicians and scientists working in dynamical systems and a useful introduction for graduate students interested in entering the field. Its wealth of examples also makes it excellent supplementary reading for any introductory course in dynamical systems"-- "In a very general sense modern theory of smooth dynamical systems deals with smooth actions of "sufficiently large but not too large" groups or semigroups (usually locally compact but not compact) on a "sufficiently small" phase space (usually compact, or, sometimes, finite volume manifolds). Important branches of dynamics specifically consider actions preserving a geometric structure with an infinite-dimensional group of automorphisms, two principal examples being a volume and a symplectic structure. The natural equivalence relation for actions is differentiable (corr. volume preserving or symplectic) conjugacy"-- v. 1. Introduction and cocycle problem -- v. 1. Introduction and cocycle problem

English [en] · PDF · 15.0MB · 2011 · 📗 Book (unknown) · 🚀/ia · Save

lgli/P_Physics/PD_Dynamical systems/Katok A., Niic V. Rigidity in higher rank Abelian group actions. Vol.1, Introduction and cocycle problem (CUP, 2011)(ISBN 0521879094)(O)(321s)_PD_.pdf

Rigidity in Higher Rank Abelian Group Actions: Volume 1, Introduction and Cocycle Problem (Cambridge Tracts in Mathematics, Series Number 185) Katok A., Niic V. Cambridge University Press (Virtual Publishing), Cambridge University Press, Cambridge, 2011

"This self-contained monograph presents rigidity theory for a large class of dynamical systems, differentiable higher rank hyperbolic and partially hyperbolic actions. This first volume describes the subject in detail and develops the principal methods presently used in various aspects of the rigidity theory. Part I serves as an exposition and preparation, including a large collection of examples that are difficult to find in the existing literature. Part II focuses on cocycle rigidity, which serves as a model for rigidity phenomena as well as a useful tool for studying them. The book is an ideal reference for applied mathematicians and scientists working in dynamical systems and a useful introduction for graduate students interested in entering the field. Its wealth of examples also makes it excellent supplementary reading for any introductory course in dynamical systems"-- "In a very general sense modern theory of smooth dynamical systems deals with smooth actions of "sufficiently large but not too large" groups or semigroups (usually locally compact but not compact) on a "sufficiently small" phase space (usually compact, or, sometimes, finite volume manifolds). Important branches of dynamics specifically consider actions preserving a geometric structure with an infinite-dimensional group of automorphisms, two principal examples being a volume and a symplectic structure. The natural equivalence relation for actions is differentiable (corr. volume preserving or symplectic) conjugacy"--

English [en] · PDF · 1.3MB · 2011 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

ia/isbn_0521840732.pdf

Modern dynamical systems and applications : dedicated to Anatole Katok on his 60th birthday A. B Katok; Michael Brin; Boris Hasselblatt; Ya B Pesin Cambridge ; New York: Cambridge University Press, Cambridge, New York, England, 2004

Presenting a wide cross-section of current research in the theory of dynamical systems, this collection consists of articles by leading researchers (and several Fields medallists) in a variety of specialties. Surveys featuring new results, as well as research papers, are included because of their potentially high impact. Major areas covered include hyperbolic dynamics, elliptic dynamics, mechanics, geometry, ergodic theory, group actions, rigidity, and applications. The target audience is dynamicists, as well as mathematicians from other disciplines.

English [en] · PDF · 32.4MB · 2004 · 📗 Book (unknown) · 🚀/ia · Save

lgli/P_Physics/PD_Dynamical systems/Handbook of dynamical systems, Vol.1B (NH, 2006)(ISBN 0444520554)(1235s)_PD_.pdf

Handbook of Dynamical Systems, Volume 1B: Volume 1B (Handbook of Dynamical Systems) A. Katok, B. Hasselblatt, H. Broer, F. Takens Elsevier Science & Technology Books, Volume 1B, 1, 2005

This second half of Volume 1 of this Handbook follows Volume 1A, which was published in 2002. The contents of these two tightly integrated parts taken together come close to a realization of the program formulated in the introductory survey "Principal Structures" of Volume 1A. The present volume contains surveys on subjects in four areas of dynamical systems: Hyperbolic dynamics, parabolic dynamics, ergodic theory and infinite-dimensional dynamical systems (partial differential equations). . Written by experts in the field. . The coverage of ergodic theory in these two parts of Volume 1 is considerably more broad and thorough than that provided in other existing sources. . The final cluster of chapters discusses partial differential equations from the point of view of dynamical systems.

English [en] · PDF · 5.8MB · 2005 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

nexusstc/Lectures on Surfaces/c2911d214110bd747b117eddb75e9fda.pdf

Lectures on Surfaces: Almost Everything You Wanted to Know About Them (Student Mathematical Library) Anatole Katok and Vaughn Climenhaga American Mathematical Society ; Mathematics Advanced Study Semesters, Student Mathematical Library, web draft, 2008

Surfaces are among the most common and easily visualized mathematical objects, and their study brings into focus fundamental ideas, concepts, and methods from geometry, topology, complex analysis, Morse theory, and group theory. At the same time, many of those notions appear in a technically simpler and more graphic form than in their general ``natural'' settings. The first, primarily expository, chapter introduces many of the principal actors--the round sphere, flat torus, Mobius strip, Klein bottle, elliptic plane, etc.--as well as various methods of describing surfaces, beginning with the traditional representation by equations in three-dimensional space, proceeding to parametric representation, and also introducing the less intuitive, but central for our purposes, representation as factor spaces. It concludes with a preliminary discussion of the metric geometry of surfaces, and the associated isometry groups. Subsequent chapters introduce fundamental mathematical structures--topological, combinatorial (piecewise linear), smooth, Riemannian (metric), and complex--in the specific context of surfaces. The focal point of the book is the Euler characteristic, which appears in many different guises and ties together concepts from combinatorics, algebraic topology, Morse theory, ordinary differential equations, and Riemannian geometry. The repeated appearance of the Euler characteristic provides both a unifying theme and a powerful illustration of the notion of an invariant in all those theories. The assumed background is the standard calculus sequence, some linear algebra, and rudiments of ODE and real analysis. All notions are introduced and discussed, and virtually all results proved, based on this background. This book is a result of the MASS course in geometry in the fall semester of 2007.

English [en] · PDF · 1.9MB · 2008 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

Your ad here.

upload/newsarch_ebooks_2025_10/2023/10/26/1470425602.pdf

Modern Theory of Dynamical Systems: A Tribute to Dmitry Victorovich Anosov (Contemporary Mathematics) Anatole Katok (editor), Yakov Pesin (editor), Federico Rodriguez Hertz (editor) American Mathematical Society, American Mathematical Society, [N.p.], 2017

This volume is a tribute to one of the founders of modern theory of dynamical systems, the late Dmitry Victorovich Anosov. It contains both original papers and surveys, written by some distinguished experts in dynamics, which are related to important themes of Anosov's work, as well as broadly interpreted further crucial developments in the theory of dynamical systems that followed Anosov's original work. Also included is an article by A. Katok that presents Anosov's scientific biography and a picture of the early development of hyperbolicity theory in its various incarnations, complete and partial, uniform and nonuniform.

English [en] · PDF · 2.7MB · 2017 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/upload/zlib · Save

duxiu/initial_release/40712030.zip

Handbook of Dynamical Systems (Volume 2) bernold fiedler North Holland; Elsevier, Elsevier Ltd., Amsterdam, 2002

This handbook is volume II in a series collecting mathematical state-of-the-art surveys in the field of dynamical systems. Much of this field has developed from interactions with other areas of science, and this volume shows how concepts of dynamical systems further the understanding of mathematical issues that arise in applications. Although modeling issues are addressed, the central theme is the mathematically rigorous investigation of the resulting differential equations and their dynamic behavior. However, the authors and editors have made an effort to ensure readability on a non-technical level for mathematicians from other fields and for other scientists and engineers. The eighteen surveys collected here do not aspire to encyclopedic completeness, but present selected paradigms. The surveys are grouped into those emphasizing finite-dimensional methods, numerics, topological methods, and partial differential equations. Application areas include the dynamics of neural networks, fluid flows, nonlinear optics, and many others. While the survey articles can be read independently, they deeply share recurrent themes from dynamical systems. Attractors, bifurcations, center manifolds, dimension reduction, ergodicity, homoclinicity, hyperbolicity, invariant and inertial manifolds, normal forms, recurrence, shift dynamics, stability, to name just a few, are ubiquitous dynamical concepts throughout the articles.

English [en] · PDF · 271.6MB · 2002 · 📗 Book (unknown) · 🚀/duxiu · Save

lgli/P_Physics/PD_Dynamical systems/Handbook of dynamical systems, Vol.3 (NH, 2010)(ISBN 0444531416)(O)(548s)_PD_.pdf

Handbook of dynamical systems, Volume 3 Includes index Broer H., Takens F., Hasselblatt B. (eds.) N.H. North Holland, Handbook of Dynamical Systems, 3, 1, 2010

In this volume, the authors present a collection of surveys on various aspects of the theory of bifurcations of differentiable dynamical systems and related topics. By selecting these subjects, they focus on those developments from which research will be active in the coming years. The surveys are intended to educate the reader on the recent literature on the following subjects: transversality and generic properties like the various forms of the so-called Kupka-Smale theorem, the Closing Lemma and generic local bifurcations of functions (so-called catastrophe theory) and generic local bifurcations in 1-parameter families of dynamical systems, and notions of structural stability and moduli. Covers recent literature on various topics related to the theory of birfurcations of differentiable dynamical systemsHighlights developments that are the foundation for future research in this fieldProvides material in the form of surveys which are important tools for introducing the birfucations of differentiable dynamical systems

English [en] · PDF · 7.1MB · 2010 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

nexusstc/Handbook of Dynamical Systems/2ea7b6734bccbc1c23564c07d319e3ea.pdf

Handbook of Dynamical Systems, Volume 1B: Volume 1B (Handbook of Dynamical Systems) A. Katok, B. Hasselblatt Elsevier Science & Technology, Handbook of Dynamical Systems, vol 1B, 1997

This second half of Volume 1 of this Handbook follows Volume 1A, which was published in 2002. The contents of these two tightly integrated parts taken together come close to a realization of the program formulated in the introductory survey "Principal Structures" of Volume 1A. The present volume contains surveys on subjects in four areas of dynamical systems: Hyperbolic dynamics, parabolic dynamics, ergodic theory and infinite-dimensional dynamical systems (partial differential equations). . Written by experts in the field. . The coverage of ergodic theory in these two parts of Volume 1 is considerably more broad and thorough than that provided in other existing sources. . The final cluster of chapters discusses partial differential equations from the point of view of dynamical systems.

English [en] · PDF · 8.3MB · 1997 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

duxiu/initial_release/40323061.zip

A first course in dynamics : with a panorama of recent developments Boris Hasselblatt, Anatole Katok, Boris Hasselblatt, A B Katok, Hasselblatt, Boris Cambridge University Press (Virtual Publishing), Cambridge, New York, England, 2002, 2002

The Theory Of Dynamical Systems Is A Major Mathematical Discipline Closely Intertwined With All Main Areas Of Mathematics. It Has Greatly Stimulated Research In Many Sciences And Given Rise To The Vast New Area Variously Called Applied Dynamics, Nonlinear Science, Or Chaos Theory. This Introduction For Senior Undergraduate And Beginning Graduate Students Of Mathematics, Physics, And Engineering Combines Mathematical Rigor With Copious Examples Of Important Applications. It Covers The Central Topological And Probabilistic Notions In Dynamics Ranging From Newtonian Mechanics To Coding Theory. Readers Need Not Be Familiar With Manifolds Or Measure Theory; The Only Prerequisite Is A Basic Undergraduate Analysis Course. The Authors Begin By Describing The Wide Array Of Scientific And Mathematical Questions That Dynamics Can Address. They Then Use A Progression Of Examples To Present The Concepts And Tools For Describing Asymptotic Behavior In Dynamical Systems, Gradually Increasing The Level Of Complexity. The Final Chapters Introduce Modern Developments And Applications Of Dynamics. Subjects Include Contractions, Logistic Maps, Equidistribution, Symbolic Dynamics, Mechanics, Hyperbolic Dynamics, Strange Attractors, Twist Maps, And Kam-theory.--pub. Desc. Pt. 1 A Course In Dynamics: From Simple To Complicated Behavior -- 2 Systems With Stable Asymptotic Behavior -- 3 Linear Maps And Linear Differential Equations -- 4 Recurrence And Equidistribution On The Circle -- 5 Recurrence And Equidistribution In Higher Dimension -- 6 Conservative Systems -- 7 Simple Systems With Complicated Orbit Structure -- 8 Entropy And Chaos -- Pt. 2 Panorama Of Dynamical Systems -- 9 Simple Dynamics As A Tool -- 10 Hyperbolic Dynamics -- 11 Quadratic Maps -- 12 Homoclinic Tangles -- 13 Strange Attractors -- 14 Variational Methods, Twist Maps, And Closed Geodesics -- 15 Dynamics, Number Theory, And Diophantine Approximatin. Boris Hasselblatt, Anatole Katok. Includes Bibliographical References And Index.

English [en] · PDF · 34.4MB · 2002 · 📗 Book (unknown) · 🚀/duxiu/zlibzh · Save

Your ad here.

lgli/P_Physics/PD_Dynamical systems/Katok A., Hasselblat B. (_Katok,Hasselblatt_) Vvedenie v teoriju dinamicheskix sistem s obzorom poslednix dostizhenij (MCNMO, 2005)(ru)(T)(466s)_PD_.djvu

Введение в теорию динамических систем с обзором последних достижений Каток А., Хасселблатт Б. МЦНМО, 2005

The Theory Of Dynamical Systems Is A Major Mathematical Discipline Closely Intertwined With All Main Areas Of Mathematics. It Has Greatly Stimulated Research In Many Sciences And Given Rise To The Vast New Area Variously Called Applied Dynamics, Nonlinear Science, Or Chaos Theory. This Introduction For Senior Undergraduate And Beginning Graduate Students Of Mathematics, Physics, And Engineering Combines Mathematical Rigor With Copious Examples Of Important Applications. It Covers The Central Topological And Probabilistic Notions In Dynamics Ranging From Newtonian Mechanics To Coding Theory. Readers Need Not Be Familiar With Manifolds Or Measure Theory; The Only Prerequisite Is A Basic Undergraduate Analysis Course. The Authors Begin By Describing The Wide Array Of Scientific And Mathematical Questions That Dynamics Can Address. They Then Use A Progression Of Examples To Present The Concepts And Tools For Describing Asymptotic Behavior In Dynamical Systems, Gradually Increasing The Level Of Complexity. The Final Chapters Introduce Modern Developments And Applications Of Dynamics. Subjects Include Contractions, Logistic Maps, Equidistribution, Symbolic Dynamics, Mechanics, Hyperbolic Dynamics, Strange Attractors, Twist Maps, And Kam-theory.--pub. Desc. Pt. 1 A Course In Dynamics: From Simple To Complicated Behavior -- 2 Systems With Stable Asymptotic Behavior -- 3 Linear Maps And Linear Differential Equations -- 4 Recurrence And Equidistribution On The Circle -- 5 Recurrence And Equidistribution In Higher Dimension -- 6 Conservative Systems -- 7 Simple Systems With Complicated Orbit Structure -- 8 Entropy And Chaos -- Pt. 2 Panorama Of Dynamical Systems -- 9 Simple Dynamics As A Tool -- 10 Hyperbolic Dynamics -- 11 Quadratic Maps -- 12 Homoclinic Tangles -- 13 Strange Attractors -- 14 Variational Methods, Twist Maps, And Closed Geodesics -- 15 Dynamics, Number Theory, And Diophantine Approximatin. Boris Hasselblatt, Anatole Katok. Includes Bibliographical References And Index.

English [en] · Russian [ru] · DJVU · 4.3MB · 2005 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

nexusstc/Введение в теорию динамических систем с обзором последних достижений/aba10e70f6fad03bbc16eea5dc673086.pdf

Введение в теорию динамических систем с обзором последних достижений А. Б. Каток, Б. Хасселблат; пер. с англ. под ред. А. С. Городецкого Cambridge University Press (Virtual Publishing), Cambridge ; New York, 2003

The Theory Of Dynamical Systems Is A Major Mathematical Discipline Closely Intertwined With All Main Areas Of Mathematics. It Has Greatly Stimulated Research In Many Sciences And Given Rise To The Vast New Area Variously Called Applied Dynamics, Nonlinear Science, Or Chaos Theory. This Introduction For Senior Undergraduate And Beginning Graduate Students Of Mathematics, Physics, And Engineering Combines Mathematical Rigor With Copious Examples Of Important Applications. It Covers The Central Topological And Probabilistic Notions In Dynamics Ranging From Newtonian Mechanics To Coding Theory. Readers Need Not Be Familiar With Manifolds Or Measure Theory; The Only Prerequisite Is A Basic Undergraduate Analysis Course. The Authors Begin By Describing The Wide Array Of Scientific And Mathematical Questions That Dynamics Can Address. They Then Use A Progression Of Examples To Present The Concepts And Tools For Describing Asymptotic Behavior In Dynamical Systems, Gradually Increasing The Level Of Complexity. The Final Chapters Introduce Modern Developments And Applications Of Dynamics. Subjects Include Contractions, Logistic Maps, Equidistribution, Symbolic Dynamics, Mechanics, Hyperbolic Dynamics, Strange Attractors, Twist Maps, And Kam-theory.--pub. Desc. Pt. 1 A Course In Dynamics: From Simple To Complicated Behavior -- 2 Systems With Stable Asymptotic Behavior -- 3 Linear Maps And Linear Differential Equations -- 4 Recurrence And Equidistribution On The Circle -- 5 Recurrence And Equidistribution In Higher Dimension -- 6 Conservative Systems -- 7 Simple Systems With Complicated Orbit Structure -- 8 Entropy And Chaos -- Pt. 2 Panorama Of Dynamical Systems -- 9 Simple Dynamics As A Tool -- 10 Hyperbolic Dynamics -- 11 Quadratic Maps -- 12 Homoclinic Tangles -- 13 Strange Attractors -- 14 Variational Methods, Twist Maps, And Closed Geodesics -- 15 Dynamics, Number Theory, And Diophantine Approximatin. Boris Hasselblatt, Anatole Katok. Includes Bibliographical References And Index.

English [en] · Russian [ru] · PDF · 18.0MB · 2003 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/G:\!genesis\_add\!woodhead\kolxo371\M_Mathematics\MP_Mathematical physics\MPd_Dynamical systems\Katok A. Combinatorial constructions in ergodic theory and dynamics (AMS, 2003)(ISBN 9780821834961)(600dpi)(K)(T)(126s)_MPd_.djvu

Combinatorial Constructions In Ergodic Theory And Dynamics (university Lecture Series) Anatole Katok American Mathematical Society, University Lecture Series, University lecture series (Providence, R.I.), 30, 2003

Ergodic theory studies measure-preserving transformations of measure spaces. These objects are intrinsically infinite, and the notion of an individual point or of an orbit makes no sense. Still there are a variety of situations when a measure-preserving transformation (and its asymptotic behavior) can be well described as a limit of certain finite objects (periodic processes). The first part of this book develops this idea systematically. Genericity of approximation in various categories is explored, and numerous applications are presented, including spectral multiplicity and properties of the maximal spectral type.The second part of the book contains a treatment of various constructions of cohomological nature with an emphasis on obtaining interesting asymptotic behavior from approximate pictures at different time scales. The book presents a view of ergodic theory not found in other expository sources. It is suitable for graduate students familiar with measure theory and basic functional analysis

English [en] · DJVU · 1.1MB · 2003 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

nexusstc/Introduction to the Modern Theory of Dynamical Systems/515a06933b788e302bae07f5661b1c1d.pdf

Introduction to the Modern Theory of Dynamical Systems (Encyclopedia of Mathematics and its Applications, Series Number 54) Anatole Katok, Boris Hasselblatt; with a supplement by Anatole Katok and Leonardo Mendoza Cambridge University Press (Virtual Publishing), Encyclopedia of mathematics and its applications ;, v. 54, Cambridge, New York, NY, USA, England, 1995

"This book provides the first self-contained comprehensive exposition of the theory of dynamical systems as a core mathematical discipline closely intertwined with most of the main areas of mathematics. The authors introduce and rigorously develop the theory while providing researchers interested in applications with fundamental tools and paradigms." "The book begins with a discussion of several elementary but fundamental examples. These are used to formulate a program for the general study of asymptotic properties and to introduce the principal theoretical concepts and methods. The main theme of the second part of the book is the interplay between local analysis near individual orbits and the global complexity of the orbits structure. The third and fourth parts develop in depth the theories of low-dimensional dynamical systems and hyperbolic dynamical systems." "The book is aimed at students and researchers in mathematics at all levels from advanced undergraduate up. Scientists and engineers working in applied dynamics, nonlinear science, and chaos will also find many fresh insights in this concrete and clear presentation. It contains more than four hundred systematic exercises."--BOOK JACKET

English [en] · PDF · 84.4MB · 1995 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/scihub/zlib · Save

lgli/P_Physics/PD_Dynamical systems/Hasselblatt B., Katok A. A first course in dynamics.. with a panorama of recent developments (CUP, 2003)(ISBN 0521587506)(O)(435s)_PD_.pdf

A first course in dynamics : with a panorama of recent developments Boris Hasselblatt; Anatole Katok Cambridge University Press (Virtual Publishing), 1, US, 2003

The Theory Of Dynamical Systems Is A Major Mathematical Discipline Closely Intertwined With All Main Areas Of Mathematics. It Has Greatly Stimulated Research In Many Sciences And Given Rise To The Vast New Area Variously Called Applied Dynamics, Nonlinear Science, Or Chaos Theory. This Introduction For Senior Undergraduate And Beginning Graduate Students Of Mathematics, Physics, And Engineering Combines Mathematical Rigor With Copious Examples Of Important Applications. It Covers The Central Topological And Probabilistic Notions In Dynamics Ranging From Newtonian Mechanics To Coding Theory. Readers Need Not Be Familiar With Manifolds Or Measure Theory; The Only Prerequisite Is A Basic Undergraduate Analysis Course. The Authors Begin By Describing The Wide Array Of Scientific And Mathematical Questions That Dynamics Can Address. They Then Use A Progression Of Examples To Present The Concepts And Tools For Describing Asymptotic Behavior In Dynamical Systems, Gradually Increasing The Level Of Complexity. The Final Chapters Introduce Modern Developments And Applications Of Dynamics. Subjects Include Contractions, Logistic Maps, Equidistribution, Symbolic Dynamics, Mechanics, Hyperbolic Dynamics, Strange Attractors, Twist Maps, And Kam-theory.--pub. Desc. Pt. 1 A Course In Dynamics: From Simple To Complicated Behavior -- 2 Systems With Stable Asymptotic Behavior -- 3 Linear Maps And Linear Differential Equations -- 4 Recurrence And Equidistribution On The Circle -- 5 Recurrence And Equidistribution In Higher Dimension -- 6 Conservative Systems -- 7 Simple Systems With Complicated Orbit Structure -- 8 Entropy And Chaos -- Pt. 2 Panorama Of Dynamical Systems -- 9 Simple Dynamics As A Tool -- 10 Hyperbolic Dynamics -- 11 Quadratic Maps -- 12 Homoclinic Tangles -- 13 Strange Attractors -- 14 Variational Methods, Twist Maps, And Closed Geodesics -- 15 Dynamics, Number Theory, And Diophantine Approximatin. Boris Hasselblatt, Anatole Katok. Includes Bibliographical References And Index.

English [en] · PDF · 4.7MB · 2003 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

Your ad here.

lgli/D:\!genesis\library.nu\0c\_162354.0c67b043ac7b98cb2b7ba476647a1555.pdf

Handbook of Dynamical Systems (Volume 2) Bernold Fiedler North Holland; Elsevier, Handbook of Dynamical Systems, 2, 1, 2002

This handbook is volume II in a series collecting mathematical state-of-the-art surveys in the field of dynamical systems. Much of this field has developed from interactions with other areas of science, and this volume shows how concepts of dynamical systems further the understanding of mathematical issues that arise in applications. Although modeling issues are addressed, the central theme is the mathematically rigorous investigation of the resulting differential equations and their dynamic behavior. However, the authors and editors have made an effort to ensure readability on a non-technical level for mathematicians from other fields and for other scientists and engineers. The eighteen surveys collected here do not aspire to encyclopedic completeness, but present selected paradigms. The surveys are grouped into those emphasizing finite-dimensional methods, numerics, topological methods, and partial differential equations. Application areas include the dynamics of neural networks, fluid flows, nonlinear optics, and many others. While the survey articles can be read independently, they deeply share recurrent themes from dynamical systems. Attractors, bifurcations, center manifolds, dimension reduction, ergodicity, homoclinicity, hyperbolicity, invariant and inertial manifolds, normal forms, recurrence, shift dynamics, stability, to name just a few, are ubiquitous dynamical concepts throughout the articles.

English [en] · PDF · 58.3MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/D:\HDD4\!genesis\SPR_NEW_2013-12\bok%3A978-1-4899-2689-0.pdf

Ergodic Theory and Dynamical Systems II: Proceedings Special Year, Maryland 1979-80 (Progress in Mathematics, 21) Zbigniew Nitecki (auth.), A. Katok (eds.) Birkhäuser Boston, Progress in Mathematics, Progress in Mathematics 21, 1, 1982

The second of two volumes, Ergodic Theory and Dynamical Systems II concludes the results of the "Special Year on Ergodic Theory" held at the University of Maryland at College Park. Each volume contains a series of lectures by well-known specialists working in the areas of dynamical systems including ergodic theory, smooth dynamical systems, classical Hamiltonian mechanics, and their applications. Among the topics discussed are ergodic theory of frame flows, topological dynamics on the interval, generic properties of continuous maps, and cross sec- tion maps for geodesic flows. Pertinent background information, as well as historical notes and bibliog- raphies, is included. CONTENTS Participants of the Special Year in Ergodic Theory and Dynamicul Systems Program of the Special Year in Ergodic Theory and Dynamical Systems Topological Dynamics on the Interval, Z. Nitecki Some Dynamical Properties of Certain Differentiable Mappings of an Interval, Part II, W. Szlenk A Note on Generic Properties of Continuous Mups E.M. Coven, J. Mudden, Z. Nitecki Cross Section Maps for Geodesic Flows, I (The Modular Surface) R. Adler, L. Platto Ergodic Theory of' F'r:,YlI,' FlaYls M. Brin Products of Independent Randomly Perturbed Matrices, E. Slud On Large Norm Periodic Solutions of Some Differential Equations, P. Rabinowitz

English [en] · PDF · 5.8MB · 1982 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/scihub/zlib · Save

nexusstc/Ergodic Theory and Dynamical Systems II: Proceedings Special Year, Maryland 1979–80/358fb97a28892104e91b7fd0aa08e33d.djvu

Ergodic Theory and Dynamical Systems II: Proceedings Special Year, Maryland 1979-80 (Progress in Mathematics, 21) Zbigniew Nitecki (auth.), A. Katok (eds.) Birkhäuser Boston, Progress in Mathematics, Progress in Mathematics 21, 1, 1982

The second of two volumes, Ergodic Theory and Dynamical Systems II concludes the results of the "Special Year on Ergodic Theory" held at the University of Maryland at College Park. Each volume contains a series of lectures by well-known specialists working in the areas of dynamical systems including ergodic theory, smooth dynamical systems, classical Hamiltonian mechanics, and their applications. Among the topics discussed are ergodic theory of frame flows, topological dynamics on the interval, generic properties of continuous maps, and cross sec- tion maps for geodesic flows. Pertinent background information, as well as historical notes and bibliog- raphies, is included. CONTENTS Participants of the Special Year in Ergodic Theory and Dynamicul Systems Program of the Special Year in Ergodic Theory and Dynamical Systems Topological Dynamics on the Interval, Z. Nitecki Some Dynamical Properties of Certain Differentiable Mappings of an Interval, Part II, W. Szlenk A Note on Generic Properties of Continuous Mups E.M. Coven, J. Mudden, Z. Nitecki Cross Section Maps for Geodesic Flows, I (The Modular Surface) R. Adler, L. Platto Ergodic Theory of' F'r:,YlI,' FlaYls M. Brin Products of Independent Randomly Perturbed Matrices, E. Slud On Large Norm Periodic Solutions of Some Differential Equations, P. Rabinowitz

English [en] · DJVU · 1.6MB · 1982 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/scihub/zlib · Save

lgli/P_Physics/PD_Dynamical systems/Katok A., Hasselblat B. (_Katok,Hasselblatt_) Vvedenie v sovremennuju teoriju dinamicheskix sistem (Faktorial 1999)(ISBN 5886880429)(ru)(T)(S)(767s)_PD_.djvu

Введение в современную теорию динамических систем Каток А., Хасселблат Б.(Katok,Hasselblatt) Факториал, М, Russia, 1999

Russian [ru] · DJVU · 9.5MB · 1999 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

duxiu/initial_release/40540251.zip

Introduction to the modern theory of dynamical systems / monograph ANATOLE KATOK BORIS HASSELBLATT, Anatole Katok, Boris Hasselblatt著, Tok Ka, Sselblatt Ha, A. B Katok CAMBRIDGE UNIVERSITY PRESS, 2010, 2010

Chinese [zh] · PDF · 188.9MB · 2010 · 📗 Book (unknown) · 🚀/duxiu/zlibzh · Save

Your ad here.

lgli/P_Physics/PD_Dynamical systems/Katok A., Hasselblatt B. Vvedenie v sovremennuju teoriju dinamicheskix sistem. Chast# 1 (Faktorial 1999)(ru)(L)(T)(199s).djvu

Введение в современную теорию динамических систем Часть 1 Каток А., Хасселблатт Б. Факториал, Часть 1, 1999

This Book Provided The First Self-contained Comprehensive Exposition Of The Theory Of Dynamical Systems As A Core Mathematical Discipline Closely Intertwined With Most Of The Main Areas Of Mathematics. The Authors Introduce And Rigorously Develop The Theory While Providing Researchers Interested In Applications With Fundamental Tools And Paradigms. The Book Begins With A Discussion Of Several Elementary But Fundamental Examples. These Are Used To Formulate A Program For The General Study Of Asymptotic Properties And To Introduce The Principal Theoretical Concepts And Methods. The Main Theme Of The Second Part Of The Book Is The Interplay Between Local Analysis Near Individual Orbits And The Global Complexity Of The Orbit Structure. The Third And Fourth Parts Develop The Theories Of Low-dimensional Dynamical Systems And Hyperbolic Dynamical Systems In Depth. Over 400 Systematic Exercises Are Included In The Text. The Book Is Aimed At Students And Researchers In Mathematics At All Levels From Advanced Undergraduate Up. Anatole Katok, Boris Hasselblatt. Includes Bibliographical References And Index.

English [en] · Russian [ru] · DJVU · 4.9MB · 1999 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

ia/ergodictheorydyn0000unse.pdf

Ergodic Theory And Dynamical Systems: Proceedings, Special Year, Maryland 1979-80 (progress In Mathematics) edited by A. Katok. 1 Birkhaeuser, Progress in mathematics ;, v. 10, 21, Progress in mathematics (Boston, Mass.) ;, v. 10, 21., Boston, Massachusetts, 1981

A. Katok, Editor. Includes Index. Includes Bibliographies.

English [en] · PDF · 11.8MB · 1981 · 📗 Book (unknown) · 🚀/ia · Save

lgli/75/M_Mathematics/Mams_Proceedings AMS/Katok A., et al. (eds.) Smooth Ergodic Theory and Its Applications (ISBN 9780821826829)(PSPUM069, AMS, 2001)(600dpi)(T)(O)(895s).djvu

Smooth Ergodic Theory and Its Applications : Proceedings of the AMS Summer Research Institute on Smooth Ergodic Theory and Its Applications, July 26-August 13, 1999, University of Washington, Seattle Katok A., et al. (eds.) American Mathematical Society, Proceedings of Symposia in Pure Mathematics 069, 2001

During the past decade, there have been several major new developments in smooth ergodic theory, which have attracted substantial interest to the field from mathematicians as well as scientists using dynamics in their work. In spite of the impressive literature, it has been extremely difficult for a student—or even an established mathematician who is not an expert in the area—to acquire a working knowledge of smooth ergodic theory and to learn how to use its tools. Accordingly, the AMS Summer Research Institute on Smooth Ergodic Theory and Its Applications (Seattle, WA) had a strong educational component, including ten mini-courses on various aspects of the topic that were presented by leading experts in the field. This volume presents the proceedings of that conference. Smooth ergodic theory studies the statistical properties of differentiable dynamical systems, whose origin traces back to the seminal works of Poincaré and later, many great mathematicians who made contributions to the development of the theory. The main topic of this volume, smooth ergodic theory, especially the theory of nonuniformly hyperbolic systems, provides the principle paradigm for the rigorous study of complicated or chaotic behavior in deterministic systems. This paradigm asserts that if a non-linear dynamical system exhibits sufficiently pronounced exponential behavior, then global properties of the system can be deduced from studying the linearized system. One can then obtain detailed information on topological properties (such as the growth of periodic orbits, topological entropy, and dimension of invariant sets including attractors), as well as statistical properties (such as the existence of invariant measures, asymptotic behavior of typical orbits, ergodicity, mixing, decay of correlations, and measure-theoretic entropy). Smooth ergodic theory also provides a foundation for numerous applications throughout mathematics (e.g., Riemannian geometry, number theory, Lie groups, and partial differential equations), as well as other sciences. This volume serves a two-fold purpose: first, it gives a useful gateway to smooth ergodic theory for students and nonspecialists, and second, it provides a state-of-the-art report on important current aspects of the subject. The book is divided into three parts: lecture notes consisting of three long expositions with proofs aimed to serve as a comprehensive and self-contained introduction to a particular area of smooth ergodic theory; thematic sections based on mini-courses or surveys held at the conference; and original contributions presented at the meeting or closely related to the topics that were discussed there.

English [en] · DJVU · 8.4MB · 2001 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/M_Mathematics/MA_Algebra/MAco_Computational algebra/Seress A. Permutation group algorithms (CUP, 2002)(600dpi)(T)(272s)_MAco_.djvu

Permutation group algorithms Seress A. Cambridge University Press (Virtual Publishing), Cambridge Tracts in Mathematics 152, 2002

Permutation group algorithms are indispensable in the proofs of many deep results, including the construction and study of sporadic finite simple groups. This work describes the theory behind permutation group algorithms, up to the most recent developments based on the classification of finite simple groups. Rigorous complexity estimates, implementation hints, and advanced exercises are included throughout. The central theme is the description of nearly linear time algorithms, which are extremely fast both in terms of asymptotic analysis and of practical running time. The book fills a significant gap in the symbolic computation literature for readers interested in using computers in group theory.

English [en] · DJVU · 3.4MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/dvd56/Duistermaat J. J., Kolk J. A. C. - Multidimensional Real Analysis I(Cambridge Studies in Advanced Mathematics _86), Vol. 1(2007)(422).pdf

Multidimensional Real Analysis I Volume 1 Duistermaat J. J., Kolk J. A. C. Cambridge University Press (Virtual Publishing), Cambridge Studies in Advanced Mathematics 86, Volume 1, 2007

The authors, affiliated with Utrecht University, present a two-volume work on the theory of vector-valued functions in multidimensional Euclidean space. This volume is devoted to differentiation, with material on differentiable functions on Rn and differentiable manifolds embedded in Rn. Chapters cover continuity, differentiation, inverse function and implicit function theorems, manifolds, and tangent spaces. Chapter exercises illustrate a variety of applications in mathematics and physics. The book can be used as a text for a course for students who wish to go on to more advanced study, as a source of problems for a seminar, or for self study.

English [en] · PDF · 28.1MB · 2007 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

Your ad here.

Multidimensional Real Analysis II: Integration (Cambridge Studies in Advanced Mathematics, Vol. 87) J. J. Duistermaat, Johan A. C. Kolk, J. P. van Braam Houckgeest, J. A. C. Kolk, B. Bollobas, W. Fulton, A. Katok Cambridge University Press (Virtual Publishing), Cambridge Studies in Advanced Mathematics, 1, 2004

Part two of the authors' comprehensive and innovative work on multidimensional real analysis. This book is based on extensive teaching experience at Utrecht University and gives a thorough account of integral analysis in multidimensional Euclidean space. It is an ideal preparation for students who wish to go on to more advanced study. The notation is carefully organized and all proofs are clean, complete and rigorous. The authors have taken care to pay proper attention to all aspects of the theory. In many respects this book presents an original treatment of the subject and it contains many results and exercises that cannot be found elsewhere. The numerous exercises illustrate a variety of applications in mathematics and physics. This combined with the exhaustive and transparent treatment of subject matter make the book ideal as either the text for a course, a source of problems for a seminar or for self study.'Throughout the text is carefully organized, proofs are complete and rigorous and the material is completed by carefully worked examples.' --- Zentralblatt fur Mathematik

English [en] · PDF · 2.0MB · 2004 · 📘 Book (non-fiction) · 🚀/zlib · Save

lgli/dvd59/Katok A., Strelcyn J.-M. - Invariant Manifolds, Entropy and Billiards; Smooth Maps with Singularities(1986)(183).djvu

Invariant Manifolds, Entropy And Billiards: Smooth Maps With Singularities (lecture Notes In Mathematics) Anatole B Katok; F Ledrappier; F Przytycki; Jean-Marie Strelcyn Springer Verlag, Lecture notes in mathematics ;, 1222, Lecture notes in mathematics (Springer-Verlag) ;, 1222., Berlin, New York, Unknown, 1986

Anatole Katok, Jean-marie Strelcyn, With The Collaboration Of Ledrappier, F. And Przytycki, F. Bibliography: P. [279]-283.

English [en] · DJVU · 1.7MB · 1986 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

nexusstc/Restricted Orbit Equivalence for Actions of Discrete Amenable Groups/e508606943fde8b3bc7c498a7fb03933.pdf

Restricted Orbit Equivalence for Actions of Discrete Amenable Groups (Cambridge Tracts in Mathematics, Series Number 146) Janet Whalen Kammeyer, Daniel J. Rudolph, B. Bollobas, W. Fulton, A. Katok Cambridge University Press (Virtual Publishing), Cambridge Tracts in Mathematics 146, First Edition, 2002

This 2002 Monograph Offers A Broad Investigative Tool In Ergodic Theory And Measurable Dynamics. The Motivation For This Work Is That One May Measure How Similar Two Dynamical Systems Are By Asking How Much The Time Structure Of Orbits Of One System Must Be Distorted For It To Become The Other. Different Restrictions On The Allowed Distortion Will Lead To Different Restricted Orbit Equivalence Theories. These Include Ornstein's Isomorphism Theory, Kakutani Equivalence Theory And A List Of Others. By Putting Such Restrictions In An Axiomatic Framework, A General Approach Is Developed That Encompasses All These Examples Simultaneously And Gives Insight Into How To Seek Further Applications. The Work Is Placed In The Context Of Discrete Amenable Group Actions Where Time Is Not Required To Be One-dimensional, Making The Results Applicable To A Much Wider Range Of Problems And Examples. Janet Whalen Kammeyer, Daniel J. Rudolph. Includes Bibliographical References And Index.

English [en] · PDF · 3.3MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

nexusstc/Restricted Orbit Equivalence for Actions of Discrete Amenable Groups/543335f590fee5fc7130155a14c6e3bf.pdf

Restricted Orbit Equivalence for Actions of Discrete Amenable Groups (Cambridge Tracts in Mathematics, Series Number 146) Janet Whalen Kammeyer, Daniel J. Rudolph, B. Bollobas, W. Fulton, A. Katok Cambridge University Press (Virtual Publishing), Cambridge Tracts in Mathematics 146, First Edition, 2002

This 2002 Monograph Offers A Broad Investigative Tool In Ergodic Theory And Measurable Dynamics. The Motivation For This Work Is That One May Measure How Similar Two Dynamical Systems Are By Asking How Much The Time Structure Of Orbits Of One System Must Be Distorted For It To Become The Other. Different Restrictions On The Allowed Distortion Will Lead To Different Restricted Orbit Equivalence Theories. These Include Ornstein's Isomorphism Theory, Kakutani Equivalence Theory And A List Of Others. By Putting Such Restrictions In An Axiomatic Framework, A General Approach Is Developed That Encompasses All These Examples Simultaneously And Gives Insight Into How To Seek Further Applications. The Work Is Placed In The Context Of Discrete Amenable Group Actions Where Time Is Not Required To Be One-dimensional, Making The Results Applicable To A Much Wider Range Of Problems And Examples. Janet Whalen Kammeyer, Daniel J. Rudolph. Includes Bibliographical References And Index.

English [en] · PDF · 2.5MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

nexusstc/Restricted Orbit Equivalence for Actions of Discrete Amenable Groups/2ed27b99e4dac494a0ffdac8e1f32972.pdf

Restricted Orbit Equivalence for Actions of Discrete Amenable Groups (Cambridge Tracts in Mathematics, Series Number 146) Janet Whalen Kammeyer, Daniel J. Rudolph, B. Bollobas, W. Fulton, A. Katok Cambridge University Press (Virtual Publishing), Cambridge Tracts in Mathematics volume 146, First Edition, 2002

This 2002 Monograph Offers A Broad Investigative Tool In Ergodic Theory And Measurable Dynamics. The Motivation For This Work Is That One May Measure How Similar Two Dynamical Systems Are By Asking How Much The Time Structure Of Orbits Of One System Must Be Distorted For It To Become The Other. Different Restrictions On The Allowed Distortion Will Lead To Different Restricted Orbit Equivalence Theories. These Include Ornstein's Isomorphism Theory, Kakutani Equivalence Theory And A List Of Others. By Putting Such Restrictions In An Axiomatic Framework, A General Approach Is Developed That Encompasses All These Examples Simultaneously And Gives Insight Into How To Seek Further Applications. The Work Is Placed In The Context Of Discrete Amenable Group Actions Where Time Is Not Required To Be One-dimensional, Making The Results Applicable To A Much Wider Range Of Problems And Examples. Janet Whalen Kammeyer, Daniel J. Rudolph. Includes Bibliographical References And Index.

English [en] · PDF · 2.3MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

Your ad here.

upload/newsarch_ebooks_2025_10/2019/04/08/0521807956_Restricted.djvu

Restricted Orbit Equivalence for Actions of Discrete Amenable Groups (Cambridge Tracts in Mathematics, Series Number 146) Janet Whalen Kammeyer, Daniel J. Rudolph, B. Bollobas, W. Fulton, A. Katok Cambridge University Press (Virtual Publishing), Cambridge tracts in mathematics, 146, Cambridge, U.K, 2010, ©2002

This 2002 Monograph Offers A Broad Investigative Tool In Ergodic Theory And Measurable Dynamics. The Motivation For This Work Is That One May Measure How Similar Two Dynamical Systems Are By Asking How Much The Time Structure Of Orbits Of One System Must Be Distorted For It To Become The Other. Different Restrictions On The Allowed Distortion Will Lead To Different Restricted Orbit Equivalence Theories. These Include Ornstein's Isomorphism Theory, Kakutani Equivalence Theory And A List Of Others. By Putting Such Restrictions In An Axiomatic Framework, A General Approach Is Developed That Encompasses All These Examples Simultaneously And Gives Insight Into How To Seek Further Applications. The Work Is Placed In The Context Of Discrete Amenable Group Actions Where Time Is Not Required To Be One-dimensional, Making The Results Applicable To A Much Wider Range Of Problems And Examples. Janet Whalen Kammeyer, Daniel J. Rudolph. Includes Bibliographical References And Index.

English [en] · DJVU · 1.2MB · 2002 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/upload/zlib · Save