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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.

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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.

English [en] · DJVU · 2.2MB · 2009 · 📘 Book (non-fiction) · 🚀/lgli/lgrs · Save

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

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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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

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

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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