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Lectures on Fractal Geometry and Dynamical Systems (Student Mathematical Library) Yakov Pesin and Vaughn Climenhaga, Yakov Pesin, Vaughn Climenhaga, Yakov B Pesin the American Mathematical Society, 2009, 2009

Both fractal geometry and dynamical systems have a long history of development and have provided fertile ground for many great mathematicians and much deep and important mathematics. These two areas interact with each other and with the theory of chaos in a fundamental way: many dynamical systems (even some very simple ones) produce fractal sets, which are in turn a source of irregular ''chaotic'' motions in the system. This book is an introduction to these two fields, with an emphasis on the relationship between them. The first half of the book introduces some of the key ideas in fractal geometry and dimension theory—Cantor sets, Hausdorff dimension, box dimension—using dynamical notions whenever possible, particularly one-dimensional Markov maps and symbolic dynamics. Various techniques for computing Hausdorff dimension are shown, leading to a discussion of Bernoulli and Markov measures and of the relationship between dimension, entropy, and Lyapunov exponents. In the second half of the book some examples of dynamical systems are considered and various phenomena of chaotic behaviour are discussed, including bifurcations, hyperbolicity, attractors, horseshoes, and intermittent and persistent chaos. These phenomena are naturally revealed in the course of our study of two real models from science—the FitzHugh-Nagumo model and the Lorenz system of differential equations. This book is accessible to undergraduate students and requires only standard knowledge in calculus, linear algebra, and differential equations. Elements of point set topology and measure theory are introduced as needed. This book is a result of the MASS course in analysis at Penn State University in the fall semester of 2008. This book is published in cooperation with Mathematics Advanced Study Semesters. \"Both fractal geometry and dynamical systems have a long history of development and have provided fertile ground for many great mathematicians and much deep and important mathematics. These...

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nexusstc/Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library)/c5379bc720e9d2c3af5f569e78ee4e6e.pdf

Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library) (Student Mathematical Library, 47) L. D. Faddeev and O. A. Yakubovskii; O.A. Yakubovskii American Mathematical Society; Mathematics Advanced Study Semesters, Student mathematical library -- v. 47, [English ed.]., Providence, R.I, [University Park, PA?], Rhode Island, 2009

This book is based on notes from the course developed and taught for more than 30 years at the Department of Mathematics of Leningrad University. The goal of the course was to present the basics of quantum mechanics and its mathematical content to students in mathematics. This book differs from the majority of other textbooks on the subject in that much more attention is paid to general principles of quantum mechanics. In particular, the authors describe in detail the relation between classical and quantum mechanics. When selecting particular topics, the authors emphasize those that are related to interesting mathematical theories. In particular, the book contains a discussion of problems related to group representation theory and to scattering theory. This book is rather elementary and concise, and it does not require prerequisites beyond the standard undergraduate mathematical curriculum. It is aimed at giving a mathematically oriented student the opportunity to grasp the main points of quantum theory in a mathematical framework.

English [en] · PDF · 2.0MB · 2009 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/Faddeev L.D., Yakubovskii O.A. Lectures on quantum mechanics for mathematics students (AMS, 2009)(ISBN 082184699X)(600dpi)(T)(O)(248s)_PQmtb_.djvu

Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library) (Student Mathematical Library, 47) L. D. Faddeev and O. A. Yakubovskii; O.A. Yakubovskii American Mathematical Society; Mathematics Advanced Study Semesters, American Mathematical Society, Providence, R.I., 2009

This book is based on notes from the course developed and taught for more than 30 years at the Department of Mathematics of Leningrad University. The goal of the course was to present the basics of quantum mechanics and its mathematical content to students in mathematics. This book differs from the majority of other textbooks on the subject in that much more attention is paid to general principles of quantum mechanics. In particular, the authors describe in detail the relation between classical and quantum mechanics. When selecting particular topics, the authors emphasize those that are related to interesting mathematical theories. In particular, the book contains a discussion of problems related to group representation theory and to scattering theory. This book is rather elementary and concise, and it does not require prerequisites beyond the standard undergraduate mathematical curriculum. It is aimed at giving a mathematically oriented student the opportunity to grasp the main points of quantum theory in a mathematical framework.

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nexusstc/Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library)/4d526e9e010328b27e509d425ba7df42.pdf

Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library) (Student Mathematical Library, 47) L. D. Faddeev and O. A. Yakubovskii; O.A. Yakubovskii American Mathematical Society; Mathematics Advanced Study Semesters, Student mathematical library -- v. 47, [English ed.]., Providence, R.I, [University Park, PA?], Rhode Island, 2009

This book is based on notes from the course developed and taught for more than 30 years at the Department of Mathematics of Leningrad University. The goal of the course was to present the basics of quantum mechanics and its mathematical content to students in mathematics. This book differs from the majority of other textbooks on the subject in that much more attention is paid to general principles of quantum mechanics. In particular, the authors describe in detail the relation between classical and quantum mechanics. When selecting particular topics, the authors emphasize those that are related to interesting mathematical theories. In particular, the book contains a discussion of problems related to group representation theory and to scattering theory. This book is rather elementary and concise, and it does not require prerequisites beyond the standard undergraduate mathematical curriculum. It is aimed at giving a mathematically oriented student the opportunity to grasp the main points of quantum theory in a mathematical framework.

English [en] · PDF · 8.6MB · 2009 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

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lgli/P_Physics/PQm_Quantum mechanics/PQmtb_Quantum mechanics textbooks/Faddeev L.D., Yakubovskii O.A. Lectures on quantum mechanics for mathematics students (AMS, 2009)(ISBN 082184699X)(600dpi)(T)(O)(248s)_PQmtb_.djvu

Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library) (Student Mathematical Library, 47) L D Faddeev; Oleg Aleksandrovich Iпё AпёЎkubovskiiМ† American Mathematical Society; Mathematics Advanced Study Semesters, Student mathematical library -- v. 47, [English ed.]., Providence, R.I, [University Park, PA?], Rhode Island, 2009

The algebra of observables in classical mechanics -- States -- Liouville's theorem, and two pictures of motion in classical mechanics -- Physical bases of quantum mechanics -- A finite-dimensional model of quantum mechanics -- States in quantum mechanics -- Heisenberg uncertainty relations -- Physical meaning of the eigenvalues and eigenvectors of observables -- Two pictures of motion in quantum mechanics. The Schrodinger equation. Stationary states -- Quantum mechanics of real systems. The Heisenberg commutation relations -- Coordinate and momentum representations -- "Eigenfunctions" of the operators Q and P -- The energy, the angular momentum, and other examples of observables -- The interconnection between quantum and classical mechanics. Passage to the limit from quantum mechanics to classical mechanics -- One-dimensional problems of quantum mechanics. A free one-dimensional particle -- The harmonic oscillator -- The problem of the oscillator in the coordinate representation -- Representation of the states of a one-dimensional particle in the sequence space [iota?]в‚‚ -- Representation of the states for a one-dimensional particle in the space D of entire analytic functions -- The general case of one-dimensional motion -- Three-dimensional problems in quantum mechanics. A three-dimensional free particle -- A three-dimensional particle in a potential field -- Angular momentum -- The rotation group -- Representations of the rotation group -- Spherically symmetric operators -- Representation of rotations by 2x2 unitary matrices -- Representation of the rotation group on a space of entire analytic functions of two complex variables -- Uniqueness of the representations D[subscript j] -- Representations of the rotation group on the space LВІ(SВІ). Spherical functions -- The radial Schrodinger equation -- The hydrogen atom. The alkali metal atoms -- Perturbation theory -- The variational principle -- Scattering theory. Physical formulation of the problem -- Scattering of a one-dimensional particle by a potential barrier -- Physical meaning of the solutions [psi]в‚Ѓ and [psi]в‚‚ -- Scattering by a potential center -- Motion of wave packets in a central force field -- The integral equation of scattering theory -- Derivation of a formula for the cross-section -- Abstract scattering theory -- Properties of commuting operators -- Representation of the state space with respect to a complete set of observables -- Spin -- Spin of a system of two electrons -- Systems of many particles. The identity principle -- Symmetry of the coordinate wave functions of a system of two electrons. The helium atom -- Multi-electron atoms. One-electron approximation -- The self-consistent field equations -- Mendeleev's periodic system of the elements -- Appendix: Lagrangian formulation of classical mechanics

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upload/newsarch_ebooks/2017/09/14/1470434792.pdf

From Groups to Geometry and Back (Student Mathematical Library) (Student Mathematical Library, 81) Vaughn Climenhaga, Anatole Katok American Mathematical Society : Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library, 2017

Groups arise naturally as symmetries of geometric objects, and so groups can be used to understand geometry and topology. Conversely, one can study abstract groups by using geometric techniques and ultimately by treating groups themselves as geometric objects. This book explores these connections between group theory and geometry, introducing some of the main ideas of transformation groups, algebraic topology, and geometric group theory. The first half of the book introduces basic notions of group theory and studies symmetry groups in various geometries, including Euclidean, projective, and hyperbolic. The classification of Euclidean isometries leads to results on regular polyhedra and polytopes; the study of symmetry groups using matrices leads to Lie groups and Lie algebras. The second half of the book explores ideas from algebraic topology and geometric group theory. The fundamental group appears as yet another group associated to a geometric object and turns out to be a symmetry group using covering spaces and deck transformations. In the other direction, Cayley graphs, planar models, and fundamental domains appear as geometric objects associated to groups. The final chapter discusses groups themselves as geometric objects, including a gentle introduction to Gromov's theorem on polynomial growth and Grigorchuk's example of intermediate growth. The book is accessible to undergraduate students (and anyone else) with a background in calculus, linear algebra, and basic real analysis, including topological notions of convergence and connectedness. This book is a result of the MASS course in algebra at Penn State University in the fall semester of 2009. This book is published in cooperation with Mathematics Advanced Study Semesters.

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nexusstc/From Groups to Geometry and Back/a37206749b78723e46fe7fd595022241.pdf

From Groups to Geometry and Back (Student Mathematical Library) (Student Mathematical Library, 81) Vaughn Climenhaga, Anatole Katok American Mathematical Society : Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library, 2017

Groups arise naturally as symmetries of geometric objects, and so groups can be used to understand geometry and topology. Conversely, one can study abstract groups by using geometric techniques and ultimately by treating groups themselves as geometric objects. This book explores these connections between group theory and geometry, introducing some of the main ideas of transformation groups, algebraic topology, and geometric group theory. The first half of the book introduces basic notions of group theory and studies symmetry groups in various geometries, including Euclidean, projective, and hyperbolic. The classification of Euclidean isometries leads to results on regular polyhedra and polytopes; the study of symmetry groups using matrices leads to Lie groups and Lie algebras. The second half of the book explores ideas from algebraic topology and geometric group theory. The fundamental group appears as yet another group associated to a geometric object and turns out to be a symmetry group using covering spaces and deck transformations. In the other direction, Cayley graphs, planar models, and fundamental domains appear as geometric objects associated to groups. The final chapter discusses groups themselves as geometric objects, including a gentle introduction to Gromov's theorem on polynomial growth and Grigorchuk's example of intermediate growth. The book is accessible to undergraduate students (and anyone else) with a background in calculus, linear algebra, and basic real analysis, including topological notions of convergence and connectedness. This book is a result of the MASS course in algebra at Penn State University in the fall semester of 2009. This book is published in cooperation with Mathematics Advanced Study Semesters.

English [en] · PDF · 7.4MB · 2017 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

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.

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lgli/75/M_Mathematics/MA_Algebra/MAc_Combinatorics/Mullen G.L., Mummert C. Finite fields and applications (STML041, AMS, 2007)(ISBN 9780821844182)(600dpi)(T)(O)(190s)_MAc_.djvu

Finite Fields and Applications (Student Mathematical Library, 41) Gary L. Mullen, Carl Mummert American Mathematical Society ; Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library 041, 2007

This book provides a brief and accessible introduction to the theory of finite fields and to some of their many fascinating and practical applications. The first chapter is devoted to the theory of finite fields. After covering their construction and elementary properties, the authors discuss the trace and norm functions, bases for finite fields, and properties of polynomials over finite fields. Each of the remaining chapters details applications. Chapter 2 deals with combinatorial topics such as the construction of sets of orthogonal latin squares, affine and projective planes, block designs, and Hadamard matrices. Chapters 3 and 4 provide a number of constructions and basic properties of error-correcting codes and cryptographic systems using finite fields. Each chapter includes a set of exercises of varying levels of difficulty which help to further explain and motivate the material. Appendix A provides a brief review of the basic number theory and abstract algebra used in the text, as well as exercises related to this material. Appendix B provides hints and partial solutions for many of the exercises in each chapter. A list of 64 references to further reading and to additional topics related to the book's material is also included. Intended for advanced undergraduate students, it is suitable both for classroom use and for individual study. This book is co-published with Mathematics Advanced Study Semesters.

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lgli/76/P_Physics/PQm_Quantum mechanics/Faddeev L.D., Yakubovski O.A. Lectures on quantum mechanics for mathematics students (STML047, AMS, 2009)(ISBN 9780821846995)(O)(252s)_PQm_.pdf

Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library) (Student Mathematical Library, 47) L. D. Faddeev and O. A. Yakubovskii; O.A. Yakubovskii American Mathematical Society; Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library 047, 2009

This book is based on notes from the course developed and taught for more than 30 years at the Department of Mathematics of Leningrad University. The goal of the course was to present the basics of quantum mechanics and its mathematical content to students in mathematics. This book differs from the majority of other textbooks on the subject in that much more attention is paid to general principles of quantum mechanics. In particular, the authors describe in detail the relation between classical and quantum mechanics. When selecting particular topics, the authors emphasize those that are related to interesting mathematical theories. In particular, the book contains a discussion of problems related to group representation theory and to scattering theory. This book is rather elementary and concise, and it does not require prerequisites beyond the standard undergraduate mathematical curriculum. It is aimed at giving a mathematically oriented student the opportunity to grasp the main points of quantum theory in a mathematical framework.

English [en] · PDF · 2.1MB · 2009 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

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P-adic Analysis Compared With Real (Student Mathematical Library) (Student Mathematical Library, 37) Svetlana Katok American Mathematical Society ; Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library 037, 2007

The book gives an introduction to $p$-adic numbers from the point of view of number theory, topology, and analysis. Compared to other books on the subject, its novelty is both a particularly balanced approach to these three points of view and an emphasis on topics accessible to undergraduates. In addition, several topics from real analysis and elementary topology which are not usually covered in undergraduate courses (totally disconnected spaces and Cantor sets, points of discontinuity of maps and the Baire Category Theorem, surjectivity of isometries of compact metric spaces) are also included in the book. They will enhance the reader's understanding of real analysis and intertwine the real and $p$-adic contexts of the book. The book is based on an advanced undergraduate course given by the author. The choice of the topic was motivated by the internal beauty of the subject of $p$-adic analysis, an unusual one in the undergraduate curriculum, and abundant opportunities to compare it with its much more familiar real counterpart. The book includes a large number of exercises. Answers, hints, and solutions for most of them appear at the end of the book. Well written, with obvious care for the reader, the book can be successfully used in a topic course or for self-study.

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upload/newsarch_ebooks_2025_10/2020/08/21/Lectures on fractal geometry and dynamical systems.pdf

Lectures on Fractal Geometry and Dynamical Systems (Student Mathematical Library) Yakov Pesin and Vaughn Climenhaga American Mathematical Society ; Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library 052, 2009

<p>Both fractal geometry and dynamical systems have a long history of development and have provided fertile ground for many great mathematicians and much deep and important mathematics. These two areas interact with each other and with the theory of chaos in a fundamental way: many dynamical systems (even some very simple ones) produce fractal sets, which are in turn a source of irregular ''chaotic'' motions in the system. This book is an introduction to these two fields, with an emphasis on the relationship between them. The first half of the book introduces some of the key ideas in fractal geometry and dimension theory—Cantor sets, Hausdorff dimension, box dimension—using dynamical notions whenever possible, particularly one-dimensional Markov maps and symbolic dynamics. Various techniques for computing Hausdorff dimension are shown, leading to a discussion of Bernoulli and Markov measures and of the relationship between dimension, entropy, and Lyapunov exponents. In the second half of the book some examples of dynamical systems are considered and various phenomena of chaotic behaviour are discussed, including bifurcations, hyperbolicity, attractors, horseshoes, and intermittent and persistent chaos. These phenomena are naturally revealed in the course of our study of two real models from science—the FitzHugh-Nagumo model and the Lorenz system of differential equations. This book is accessible to undergraduate students and requires only standard knowledge in calculus, linear algebra, and differential equations. Elements of point set topology and measure theory are introduced as needed. This book is a result of the MASS course in analysis at Penn State University in the fall semester of 2008. This book is published in cooperation with Mathematics Advanced Study Semesters.</p>

English [en] · PDF · 4.4MB · 2009 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/upload/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

nexusstc/Lectures on quantum mechanics for mathematics students/8ebc278e46ab896177d5f6d9009f9c01.pdf

Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library) (Student Mathematical Library, 47) L D Faddeev; Oleg Aleksandrovich Iпё AпёЎkubovskiiМ† American Mathematical Society; Mathematics Advanced Study Semesters, Student mathematical library -- v. 47, [English ed.]., Providence, R.I, [University Park, PA?], Rhode Island, 2009

The algebra of observables in classical mechanics -- States -- Liouville's theorem, and two pictures of motion in classical mechanics -- Physical bases of quantum mechanics -- A finite-dimensional model of quantum mechanics -- States in quantum mechanics -- Heisenberg uncertainty relations -- Physical meaning of the eigenvalues and eigenvectors of observables -- Two pictures of motion in quantum mechanics. The Schrodinger equation. Stationary states -- Quantum mechanics of real systems. The Heisenberg commutation relations -- Coordinate and momentum representations -- "Eigenfunctions" of the operators Q and P -- The energy, the angular momentum, and other examples of observables -- The interconnection between quantum and classical mechanics. Passage to the limit from quantum mechanics to classical mechanics -- One-dimensional problems of quantum mechanics. A free one-dimensional particle -- The harmonic oscillator -- The problem of the oscillator in the coordinate representation -- Representation of the states of a one-dimensional particle in the sequence space [iota?]в‚‚ -- Representation of the states for a one-dimensional particle in the space D of entire analytic functions -- The general case of one-dimensional motion -- Three-dimensional problems in quantum mechanics. A three-dimensional free particle -- A three-dimensional particle in a potential field -- Angular momentum -- The rotation group -- Representations of the rotation group -- Spherically symmetric operators -- Representation of rotations by 2x2 unitary matrices -- Representation of the rotation group on a space of entire analytic functions of two complex variables -- Uniqueness of the representations D[subscript j] -- Representations of the rotation group on the space LВІ(SВІ). Spherical functions -- The radial Schrodinger equation -- The hydrogen atom. The alkali metal atoms -- Perturbation theory -- The variational principle -- Scattering theory. Physical formulation of the problem -- Scattering of a one-dimensional particle by a potential barrier -- Physical meaning of the solutions [psi]в‚Ѓ and [psi]в‚‚ -- Scattering by a potential center -- Motion of wave packets in a central force field -- The integral equation of scattering theory -- Derivation of a formula for the cross-section -- Abstract scattering theory -- Properties of commuting operators -- Representation of the state space with respect to a complete set of observables -- Spin -- Spin of a system of two electrons -- Systems of many particles. The identity principle -- Symmetry of the coordinate wave functions of a system of two electrons. The helium atom -- Multi-electron atoms. One-electron approximation -- The self-consistent field equations -- Mendeleev's periodic system of the elements -- Appendix: Lagrangian formulation of classical mechanics

English [en] · PDF · 5.1MB · 2009 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

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nexusstc/Lectures on quantum mechanics for mathematics students/bfb3efe29212dfff345c4fbe0c70a9e0.pdf

Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library) (Student Mathematical Library, 47) L D Faddeev; Oleg Aleksandrovich Iпё AпёЎkubovskiiМ† American Mathematical Society; Mathematics Advanced Study Semesters, Student mathematical library -- v. 47, [English ed.]., Providence, R.I, [University Park, PA?], Rhode Island, 2009

The algebra of observables in classical mechanics -- States -- Liouville's theorem, and two pictures of motion in classical mechanics -- Physical bases of quantum mechanics -- A finite-dimensional model of quantum mechanics -- States in quantum mechanics -- Heisenberg uncertainty relations -- Physical meaning of the eigenvalues and eigenvectors of observables -- Two pictures of motion in quantum mechanics. The Schrodinger equation. Stationary states -- Quantum mechanics of real systems. The Heisenberg commutation relations -- Coordinate and momentum representations -- "Eigenfunctions" of the operators Q and P -- The energy, the angular momentum, and other examples of observables -- The interconnection between quantum and classical mechanics. Passage to the limit from quantum mechanics to classical mechanics -- One-dimensional problems of quantum mechanics. A free one-dimensional particle -- The harmonic oscillator -- The problem of the oscillator in the coordinate representation -- Representation of the states of a one-dimensional particle in the sequence space [iota?]в‚‚ -- Representation of the states for a one-dimensional particle in the space D of entire analytic functions -- The general case of one-dimensional motion -- Three-dimensional problems in quantum mechanics. A three-dimensional free particle -- A three-dimensional particle in a potential field -- Angular momentum -- The rotation group -- Representations of the rotation group -- Spherically symmetric operators -- Representation of rotations by 2x2 unitary matrices -- Representation of the rotation group on a space of entire analytic functions of two complex variables -- Uniqueness of the representations D[subscript j] -- Representations of the rotation group on the space LВІ(SВІ). Spherical functions -- The radial Schrodinger equation -- The hydrogen atom. The alkali metal atoms -- Perturbation theory -- The variational principle -- Scattering theory. Physical formulation of the problem -- Scattering of a one-dimensional particle by a potential barrier -- Physical meaning of the solutions [psi]в‚Ѓ and [psi]в‚‚ -- Scattering by a potential center -- Motion of wave packets in a central force field -- The integral equation of scattering theory -- Derivation of a formula for the cross-section -- Abstract scattering theory -- Properties of commuting operators -- Representation of the state space with respect to a complete set of observables -- Spin -- Spin of a system of two electrons -- Systems of many particles. The identity principle -- Symmetry of the coordinate wave functions of a system of two electrons. The helium atom -- Multi-electron atoms. One-electron approximation -- The self-consistent field equations -- Mendeleev's periodic system of the elements -- Appendix: Lagrangian formulation of classical mechanics

English [en] · PDF · 16.9MB · 2009 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

nexusstc/Lectures on quantum mechanics for mathematics students/4a6c86c200397d0f8317a6f2fdcf28d8.djvu

Lectures on Quantum Mechanics for Mathematics Students (Student Mathematical Library) (Student Mathematical Library, 47) L D Faddeev; Oleg Aleksandrovich Iпё AпёЎkubovskiiМ† American Mathematical Society; Mathematics Advanced Study Semesters, Student mathematical library -- v. 47, [English ed.]., Providence, R.I, [University Park, PA?], Rhode Island, 2009

The algebra of observables in classical mechanics -- States -- Liouville's theorem, and two pictures of motion in classical mechanics -- Physical bases of quantum mechanics -- A finite-dimensional model of quantum mechanics -- States in quantum mechanics -- Heisenberg uncertainty relations -- Physical meaning of the eigenvalues and eigenvectors of observables -- Two pictures of motion in quantum mechanics. The Schrodinger equation. Stationary states -- Quantum mechanics of real systems. The Heisenberg commutation relations -- Coordinate and momentum representations -- "Eigenfunctions" of the operators Q and P -- The energy, the angular momentum, and other examples of observables -- The interconnection between quantum and classical mechanics. Passage to the limit from quantum mechanics to classical mechanics -- One-dimensional problems of quantum mechanics. A free one-dimensional particle -- The harmonic oscillator -- The problem of the oscillator in the coordinate representation -- Representation of the states of a one-dimensional particle in the sequence space [iota?]в‚‚ -- Representation of the states for a one-dimensional particle in the space D of entire analytic functions -- The general case of one-dimensional motion -- Three-dimensional problems in quantum mechanics. A three-dimensional free particle -- A three-dimensional particle in a potential field -- Angular momentum -- The rotation group -- Representations of the rotation group -- Spherically symmetric operators -- Representation of rotations by 2x2 unitary matrices -- Representation of the rotation group on a space of entire analytic functions of two complex variables -- Uniqueness of the representations D[subscript j] -- Representations of the rotation group on the space LВІ(SВІ). Spherical functions -- The radial Schrodinger equation -- The hydrogen atom. The alkali metal atoms -- Perturbation theory -- The variational principle -- Scattering theory. Physical formulation of the problem -- Scattering of a one-dimensional particle by a potential barrier -- Physical meaning of the solutions [psi]в‚Ѓ and [psi]в‚‚ -- Scattering by a potential center -- Motion of wave packets in a central force field -- The integral equation of scattering theory -- Derivation of a formula for the cross-section -- Abstract scattering theory -- Properties of commuting operators -- Representation of the state space with respect to a complete set of observables -- Spin -- Spin of a system of two electrons -- Systems of many particles. The identity principle -- Symmetry of the coordinate wave functions of a system of two electrons. The helium atom -- Multi-electron atoms. One-electron approximation -- The self-consistent field equations -- Mendeleev's periodic system of the elements -- Appendix: Lagrangian formulation of classical mechanics

English [en] · DJVU · 1.3MB · 2009 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/zlib · Save

lgli/M_Mathematics/MA_Algebra/MAtg_Group theory/Climenhaga V., Katok A. From groups to geometry and back (AMS, 2017)(ISBN 9781470434793)(O)(431s)_MAtg_.pdf

From Groups to Geometry and Back (Student Mathematical Library) (Student Mathematical Library, 81) Vaughn Climenhaga, Anatole Katok American Mathematical Society : Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library, 2017

Groups arise naturally as symmetries of geometric objects, and so groups can be used to understand geometry and topology. Conversely, one can study abstract groups by using geometric techniques and ultimately by treating groups themselves as geometric objects. This book explores these connections between group theory and geometry, introducing some of the main ideas of transformation groups, algebraic topology, and geometric group theory. The first half of the book introduces basic notions of group theory and studies symmetry groups in various geometries, including Euclidean, projective, and hyperbolic. The classification of Euclidean isometries leads to results on regular polyhedra and polytopes; the study of symmetry groups using matrices leads to Lie groups and Lie algebras. The second half of the book explores ideas from algebraic topology and geometric group theory. The fundamental group appears as yet another group associated to a geometric object and turns out to be a symmetry group using covering spaces and deck transformations. In the other direction, Cayley graphs, planar models, and fundamental domains appear as geometric objects associated to groups. The final chapter discusses groups themselves as geometric objects, including a gentle introduction to Gromov's theorem on polynomial growth and Grigorchuk's example of intermediate growth. The book is accessible to undergraduate students (and anyone else) with a background in calculus, linear algebra, and basic real analysis, including topological notions of convergence and connectedness. This book is a result of the MASS course in algebra at Penn State University in the fall semester of 2009. This book is published in cooperation with Mathematics Advanced Study Semesters.

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Finite Fields and Applications (Student Mathematical Library, 41) Gary L. Mullen, Carl Mummert American Mathematical Society ; Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library 041, 2007

This book provides a brief and accessible introduction to the theory of finite fields and to some of their many fascinating and practical applications. The first chapter is devoted to the theory of finite fields. After covering their construction and elementary properties, the authors discuss the trace and norm functions, bases for finite fields, and properties of polynomials over finite fields. Each of the remaining chapters details applications. Chapter 2 deals with combinatorial topics such as the construction of sets of orthogonal latin squares, affine and projective planes, block designs, and Hadamard matrices. Chapters 3 and 4 provide a number of constructions and basic properties of error-correcting codes and cryptographic systems using finite fields. Each chapter includes a set of exercises of varying levels of difficulty which help to further explain and motivate the material. Appendix A provides a brief review of the basic number theory and abstract algebra used in the text, as well as exercises related to this material. Appendix B provides hints and partial solutions for many of the exercises in each chapter. A list of 64 references to further reading and to additional topics related to the book's material is also included. Intended for advanced undergraduate students, it is suitable both for classroom use and for individual study. This book is co-published with Mathematics Advanced Study Semesters.

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lgli/Geometry and Billiards (2005)Serge Tabachnikov.pdf

Geometry and Billiards (Student Mathematical Library) (Student Mathematical Library, 30) Serge Tabachnikov; Pennsylvania State University. Mathematics Advanced Study Semesters American Mathematical Society ; Mathematics Advanced Study Semesters, Student mathematical library, Providence, R.I., [Place of publication not identified, ©2005

Based on the file with md5=932319B3DC8DA1FB1009734E572C8E3D, the contents/outline/bookmark is added by using MasterPDF(free version). Mathematical billiards describe the motion of a mass point in a domain with elastic reflections off the boundary or, equivalently, the behavior of rays of light in a domain with ideally reflecting boundary. From the point of view of differential geometry, the billiard flow is the geodesic flow on a manifold with boundary. This book is devoted to billiards in their relation with differential geometry, classical mechanics, and geometrical optics. Topics covered include variational principles of billiard motion, symplectic geometry of rays of light and integral geometry, existence and nonexistence of caustics, optical properties of conics and quadrics and completely integrable billiards, periodic billiard trajectories, polygonal billiards, mechanisms of chaos in billiard dynamics, and the lesser-known subject of dual (or outer) billiards. The book is based on an advanced undergraduate topics course. Minimum prerequisites are the standard material covered in the first two years of college mathematics (the entire calculus sequence, linear algebra). However, readers should show some mathematical maturity and rely on their mathematical common sense. A unique feature of the book is the coverage of many diverse topics related to billiards, for example, evolutes and involutes of plane curves, the four-vertex theorem, a mathematical theory of rainbows, distribution of first digits in various sequences, Morse theory, the Poincaré recurrence theorem, Hilbert's fourth problem, Poncelet porism, and many others. There are approximately 100 illustrations. The book is suitable for advanced undergraduates, graduate students, and researchers interested in ergodic theory and geometry. This volume has been copublished with the Mathematics Advanced Study Semesters program at Penn State.

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lgli/76/M_Mathematics/MD_Geometry and topology/Tabachnikov S. Geometry and billiards (STML030, AMS, 2005)(ISBN 9780821839195)(600dpi)(T)(O)(192s)_MD_.djvu

Geometry and Billiards (Student Mathematical Library) (Student Mathematical Library, 30) Serge Tabachnikov; Pennsylvania State University. Mathematics Advanced Study Semesters American Mathematical Society ; Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library, 2005

Mathematical billiards describe the motion of a mass point in a domain with elastic reflections off the boundary or, equivalently, the behavior of rays of light in a domain with ideally reflecting boundary. From the point of view of differential geometry, the billiard flow is the geodesic flow on a manifold with boundary. This book is devoted to billiards in their relation with differential geometry, classical mechanics, and geometrical optics. Topics covered include variational principles of billiard motion, symplectic geometry of rays of light and integral geometry, existence and nonexistence of caustics, optical properties of conics and quadrics and completely integrable billiards, periodic billiard trajectories, polygonal billiards, mechanisms of chaos in billiard dynamics, and the lesser-known subject of dual (or outer) billiards. The book is based on an advanced undergraduate topics course. Minimum prerequisites are the standard material covered in the first two years of college mathematics (the entire calculus sequence, linear algebra). However, readers should show some mathematical maturity and rely on their mathematical common sense. A unique feature of the book is the coverage of many diverse topics related to billiards, for example, evolutes and involutes of plane curves, the four-vertex theorem, a mathematical theory of rainbows, distribution of first digits in various sequences, Morse theory, the PoincarÃ© recurrence theorem, Hilbert's fourth problem, Poncelet porism, and many others. There are approximately 100 illustrations. The book is suitable for advanced undergraduates, graduate students, and researchers interested in ergodic theory and geometry. This volume has been copublished with the Mathematics Advanced Study Semesters program at Penn State.

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upload/emo37c/2024-10-21/content/Maths and Statistics Pack 1 (25 Titles)(pdf)/Geometry and Billiards - Serge Tabachnikov.pdf

Geometry and Billiards (Student Mathematical Library) (Student Mathematical Library, 30) Serge Tabachnikov; Pennsylvania State University. Mathematics Advanced Study Semesters American Mathematical Society ; Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library, 2005

Mathematical billiards describe the motion of a mass point in a domain with elastic reflections off the boundary or, equivalently, the behavior of rays of light in a domain with ideally reflecting boundary. From the point of view of differential geometry, the billiard flow is the geodesic flow on a manifold with boundary. This book is devoted to billiards in their relation with differential geometry, classical mechanics, and geometrical optics. Topics covered include variational principles of billiard motion, symplectic geometry of rays of light and integral geometry, existence and nonexistence of caustics, optical properties of conics and quadrics and completely integrable billiards, periodic billiard trajectories, polygonal billiards, mechanisms of chaos in billiard dynamics, and the lesser-known subject of dual (or outer) billiards. The book is based on an advanced undergraduate topics course. Minimum prerequisites are the standard material covered in the first two years of college mathematics (the entire calculus sequence, linear algebra). However, readers should show some mathematical maturity and rely on their mathematical common sense. A unique feature of the book is the coverage of many diverse topics related to billiards, for example, evolutes and involutes of plane curves, the four-vertex theorem, a mathematical theory of rainbows, distribution of first digits in various sequences, Morse theory, the PoincarÃ© recurrence theorem, Hilbert's fourth problem, Poncelet porism, and many others. There are approximately 100 illustrations. The book is suitable for advanced undergraduates, graduate students, and researchers interested in ergodic theory and geometry. This volume has been copublished with the Mathematics Advanced Study Semesters program at Penn State.

English [en] · PDF · 1.2MB · 2005 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/upload/zlib · Save

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An Introduction to Ramsey Theory: Fast Functions, Infinity, and Metamathematics (Student Mathematical Library) Matthew Katz; Jan Reimann; Pennsylvania State University. Mathematics Advanced Study Semesters American Mathematical Society, Student mathematical library, Providence, Rhode Island, 2018

This book takes the reader on a journey through Ramsey theory, from graph theory and combinatorics to set theory to logic and metamathematics. Written in an informal style with few requisites, it develops two basic principles of Ramsey theory: many combinatorial properties persist under partitions, but to witness this persistence, one has to start with very large objects. The interplay between those two principles not only produces beautiful theorems but also touches the very foundations of mathematics. In the course of this book, the reader will learn about both aspects. Among the topics explored are Ramsey's theorem for graphs and hypergraphs, van der Waerden's theorem on arithmetic progressions, infinite ordinals and cardinals, fast growing functions, logic and provability, Gödel incompleteness, and the Paris-Harrington theorem. Quoting from the book, “There seems to be a murky abyss lurking at the bottom of mathematics. While in many ways we cannot hope to reach solid ground, mathematicians have built impressive ladders that let us explore the depths of this abyss and marvel at the limits and at the power of mathematical reasoning at the same time. Ramsey theory is one of those ladders.”

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Winding Around: The Winding Number in Topology, Geometry, and Analysis (Student Mathematical Library) John Roe American Mathematical Society [AMS] & Mathematics Advanced Study Semesters, Student Mathematical Library, 76, 1, 2015

Main subject categories: • Winding number • Winding number degree • Topology • Geometry • Homotopy2010 Mathematics Subject Classification. • Primary • 55M25 Degree, winding number • Secondary 55M05 Duality in algebraic topology • 47A53 (Semi-) Fredholm operators; index theories • 58A10 Differential forms in global analysis • 55N15 Topological K-theoryThe winding number is one of the most basic invariants in topology. It measures the number of times a moving point P goes around a fixed point Q, provided that P travels on a path that never goes through Q and that the final position of P is the same as its starting position. This simple idea has far-reaching applications. The reader of this book will learn how the winding number can help us show that every polynomial equation has a root (the fundamental theorem of algebra),guarantee a fair division of three objects in space by a single planar cut (the ham sandwich theorem),explain why every simple closed curve has an inside and an outside (the Jordan curve theorem),relate calculus to curvature and the singularities of vector fields (the Hopf index theorem),allow one to subtract infinity from infinity and get a finite answer (Toeplitz operators),generalize to give a fundamental and beautiful insight into the topology of matrix groups (the Bott periodicity theorem). All these subjects and more are developed starting only from mathematics that is common in final-year undergraduate courses.This version is equipped with better PDF bookmarks.

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lgli/N:\!genesis_files_for_add\_add\kolxo3\94\M_Mathematics\MA_Algebra\MAc_Combinatorics/Katz M., Reimann J. An introduction to Ramsey theory. Fast functions, infinity, and metamathematics (stml-87, AMS, 2018)(ISBN 9781470442903)(O)(224s)_MAc_.pdf

An Introduction to Ramsey Theory: Fast Functions, Infinity, and Metamathematics (Student Mathematical Library) Matthew Katz; Jan Reimann; Pennsylvania State University. Mathematics Advanced Study Semesters American Mathematical Society, Student Mathematical Library (Book 87), 2018

This book takes the reader on a journey through Ramsey theory, from graph theory and combinatorics to set theory to logic and metamathematics. Written in an informal style with few requisites, it develops two basic principles of Ramsey theory: many combinatorial properties persist under partitions, but to witness this persistence, one has to start with very large objects. The interplay between those two principles not only produces beautiful theorems but also touches the very foundations of mathematics. In the course of this book, the reader will learn about both aspects. Among the topics explored are Ramsey's theorem for graphs and hypergraphs, van der Waerden's theorem on arithmetic progressions, infinite ordinals and cardinals, fast growing functions, logic and provability, Gödel incompleteness, and the Paris-Harrington theorem. Quoting from the book, “There seems to be a murky abyss lurking at the bottom of mathematics. While in many ways we cannot hope to reach solid ground, mathematicians have built impressive ladders that let us explore the depths of this abyss and marvel at the limits and at the power of mathematical reasoning at the same time. Ramsey theory is one of those ladders.”

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ia/classicalmechani0000levi.pdf

Classical Mechanics With Calculus of Variations and Optimal Control: An Intuitive Introduction (Student Mathematical Library) (Student Mathematical Library, 69) Mark Levi American Mathematical Soc. / archive.org, Student Mathematical Library, 69, F First Edition, 2014

It is hard to imagine a more original and insightful approach to classical mechanics. Most physicists would regard this as a well-worn and settled subject. But Mark Levi's treatment sparkles with freshness in the many examples he treats and his unexpected analogies, as well as the new approach he brings to the principles. This is inspired pedagogy at the highest level. —Michael Berry, Bristol University, UK How do you write a textbook on classical mechanics that is fun to learn from? Mark Levi shows us the way with his new book: “Classical Mechanics with Calculus of Variations and Optimal Control: An Intuitive Introduction.” The combination of his unique point of view with his physical and geometrical insights and numerous instructive examples, figures and problem sets make it a pleasure to work through. —Paul Rabinowitz, University of Wisconsin This is a refreshingly low key, down-to-earth account of the basic ideas in Euler-Lagrange and Hamilton-Jacobi theory and of the basic mathematical tools that relate these two theories. By emphasizing the ideas involved and relegating to the margins complicated computations and messy formulas, he has written a textbook on an ostensibly graduate level subject that second and third year undergraduates will find tremendously inspiring. —Victor Guillemin, MIT This is an intuitively motivated presentation of many topics in classical mechanics and related areas of control theory and calculus of variations. All topics throughout the book are treated with zero tolerance for unrevealing definitions and for proofs which leave the reader in the dark. Some areas of particular interest are: an extremely short derivation of the ellipticity of planetary orbits; a statement and an explanation of the “tennis racket paradox”; a heuristic explanation (and a rigorous treatment) of the gyroscopic effect; a revealing equivalence between the dynamics of a particle and statics of a spring; a short geometrical explanation of Pontryagin's Maximum Principle, and more. In the last chapter, aimed at more advanced readers, the Hamiltonian and the momentum are compared to forces in a certain static problem. This gives a palpable physical meaning to some seemingly abstract concepts and theorems. With minimal prerequisites consisting of basic calculus and basic undergraduate physics, this book is suitable for courses from an undergraduate to a beginning graduate level, and for a mixed audience of mathematics, physics and engineering students. Much of the enjoyment of the subject lies in solving almost 200 problems in this book.</p

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nexusstc/Winding Around/72d4df60f9b74b95b6cfdbdab281d621.pdf

Winding Around: The Winding Number in Topology, Geometry, and Analysis (Student Mathematical Library) John Roe American Mathematical Society [AMS] & Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library, 2015

Main subject categories: • Winding number • Winding number degree • Topology • Geometry • Homotopy2010 Mathematics Subject Classification. • Primary • 55M25 Degree, winding number • Secondary 55M05 Duality in algebraic topology • 47A53 (Semi-) Fredholm operators; index theories • 58A10 Differential forms in global analysis • 55N15 Topological K-theoryThe winding number is one of the most basic invariants in topology. It measures the number of times a moving point $P$ goes around a fixed point $Q$, provided that $P$ travels on a path that never goes through $Q$ and that the final position of $P$ is the same as its starting position. This simple idea has far-reaching applications. The reader of this book will learn how the winding number can help us show that every polynomial equation has a root (the fundamental theorem of algebra), guarantee a fair division of three objects in space by a single planar cut (the ham sandwich theorem), explain why every simple closed curve has an inside and an outside (the Jordan curve theorem), relate calculus to curvature and the singularities of vector fields (the Hopf index theorem), allow one to subtract infinity from infinity and get a finite answer (Toeplitz operators), generalize to give a fundamental and beautiful insight into the topology of matrix groups (the Bott periodicity theorem). All these subjects and more are developed starting only from mathematics that is common in final-year undergraduate courses. This book is published in cooperation with Mathematics Advanced Study Semesters.

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ia/massselectateach0000unse.pdf

MASS selecta : teaching and learning advanced undergraduate mathematics edited by Svetlana Katok, Alexei Sossinsky, and Serge Tabachnikov Providence, R.I.: American Mathematical Society, Providence, RI, Rhode Island, 2003

vi, 313 p. ; 26 cm Includes bibliographical references

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upload/newsarch_ebooks_2025_10/2018/09/02/1470421984_Winding.pdf

Winding Around: The Winding Number in Topology, Geometry, and Analysis (Student Mathematical Library) John Roe American Mathematical Society [AMS] & Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library, 2015

Main subject categories: • Winding number • Winding number degree • Topology • Geometry • Homotopy2010 Mathematics Subject Classification. • Primary • 55M25 Degree, winding number • Secondary 55M05 Duality in algebraic topology • 47A53 (Semi-) Fredholm operators; index theories • 58A10 Differential forms in global analysis • 55N15 Topological K-theoryThe winding number is one of the most basic invariants in topology. It measures the number of times a moving point $P$ goes around a fixed point $Q$, provided that $P$ travels on a path that never goes through $Q$ and that the final position of $P$ is the same as its starting position. This simple idea has far-reaching applications. The reader of this book will learn how the winding number can help us show that every polynomial equation has a root (the fundamental theorem of algebra), guarantee a fair division of three objects in space by a single planar cut (the ham sandwich theorem), explain why every simple closed curve has an inside and an outside (the Jordan curve theorem), relate calculus to curvature and the singularities of vector fields (the Hopf index theorem), allow one to subtract infinity from infinity and get a finite answer (Toeplitz operators), generalize to give a fundamental and beautiful insight into the topology of matrix groups (the Bott periodicity theorem). All these subjects and more are developed starting only from mathematics that is common in final-year undergraduate courses. This book is published in cooperation with Mathematics Advanced Study Semesters

English [en] · Shona [sn] · PDF · 4.2MB · 2015 · 📘 Book (non-fiction) · 🚀/lgli/lgrs/nexusstc/upload/zlib · Save

lgli/K:\_add\2\kolxoz\78\78\M_Mathematics\MD_Geometry and topology\MDat_Algebraic and differential topology\Roe J. Winding around. The winding number in topology, geometry, and analysis (AMS, 2015)(ISBN 9781470421984)(600dpi)(K)(T)(O)(287s)_MDat_.djvu

Winding Around: The Winding Number in Topology, Geometry, and Analysis (Student Mathematical Library) Roe, John American Mathematical Society [AMS] & Mathematics Advanced Study Semesters, The Student Mathematical Library, Student Mathematical Library, 2015

The winding number is one of the most basic invariants in topology. It measures the number of times a moving point $P$ goes around a fixed point $Q$, provided that $P$ travels on a path that never goes through $Q$ and that the final position of $P$ is the same as its starting position. This simple idea has far-reaching applications. The reader of this book will learn how the winding number can help us show that every polynomial equation has a root (the fundamental theorem of algebra), guarantee a fair division of three objects in space by a single planar cut (the ham sandwich theorem), explain why every simple closed curve has an inside and an outside (the Jordan curve theorem), relate calculus to curvature and the singularities of vector fields (the Hopf index theorem), allow one to subtract infinity from infinity and get a finite answer (Toeplitz operators), generalize to give a fundamental and beautiful insight into the topology of matrix groups (the Bott periodicity theorem). All these subjects and more are developed starting only from mathematics that is common in final-year undergraduate courses. This book is published in cooperation with Mathematics Advanced Study Semesters.

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