07655nam a2200349 i 4500991003377429707536170530t2013 nyua b 001 0 eng d9781489993625b14324635-39ule_instBibl. Dip.le Aggr. Matematica e Fisica - Sez. Matematicaeng530.1523AMS 81-02AMS 46N50LC QC174.12.H346Hall, Brian C.,author.149974Quantum theory for mathematicians /Brian C. Hall.New York :Springer,c2013xvi, 554 p. :ill. ;24 cmtexttxtrdacontentunmediatednrdamediavolumencrdacarrierGraduate texts in mathematics,0072-5285 ;267Includes bibliographical references (pages 545-548) and indexThe experimental origins of quantum mechanics:Is light a wave or a particle? ;Is an electron a wave or a particle? ;SchroÌ̂dinger and Heisenberg ;A matter of interpretation ;Exercises --A first approach to classical mechanics:Motion in RÂ¹ ;Motion in R[superscript n] ;Systems of particles ;Angular momentum ;Poisson brackets and Hamiltonian mechanics ;The Kepler problem and the Runge-Lenz vector ;Exercises --First approach to quantum mechanics:Waves, particles, and probabilities ;A few words about operators and their adjoints ;Position and the position operator ;Momentum and the momentum operator ;The position and momentum operators ;Axioms of quantum mechanics : operators and measurements ;Time-evolution in quantum theory ;The Heisenberg picture ;Example : a particle in a box ;Quantum mechanics for a particle in R [superscript n] ;Systems of multiple particles ;Physics notation ;Exercises --The free SchroÌ̂dinger equation:Solution by means of the Fourier transform ;Solution as a convolution ;Propagation of the wave packet : first approach ;Propagation of the wave packet : second approach ;Spread of the wave packet ;Exercises --Particle in a square well:The time-independent SchroÌ̂dinger equation ;Domain questions and the matching conditions ;Finding square-integrable solutions ;Tunneling and the classically forbidden region ;Discrete and continuous spectrum ;Exercises --Perspectives on the spectral theorem:The difficulties with the infinite-dimensional case ;The goals of spectral theory ;A guide to reading ;The position operator ;Multiplication operators ;The momentum operator --The spectral theorem for bounded self-adjoint operators : statements:Elementary properties of bounded operators ;Spectral theorem for bounded self-adjoint operators, I ;Spectral theorem for bounded self-adjoint operators, II ;Exercises --The spectral theorem for bounded self-adjoint operators : proofs:Proof of the spectral theorem, first version ;Proof of the spectral theorem, second version ;Exercises --Unbounded self-adjoint operators:Introduction ;Adjoint and closure of an unbounded operator ;Elementary properties of adjoints and closed operators ;The spectrum of an unbounded operator ;Conditions for self-adjointness and essential self-adjointness ;A counterexample ;An example ;The basic operators of quantum mechanics ;Sums of self-adjoint operators ;Another counterexample ;Exercises --The spectral theorem for unbounded self-adjoint operators:Statements of the spectral theorem ;Stone's theorem and one-parameter unitary groups ;The spectral theorem for bounded normal operators ;Proof of the spectral theorem for unbounded self-adjoint operators ;Exercises --The harmonic oscillator:The role of the harmonic oscillator ;The algebraic approach ;The analytic approach ;Domain conditions and completeness ;Exercises --The uncertainty principle:Uncertainty principle, first version ;A counterexample ;Uncertainty principle, second version ;Minimum uncertainty states ;Exercises --Quantization schemes for Euclidean space:Ordering ambiguities ;Some common quantization schemes ;The Weyl quantization for RÂ²[superscript n] ;The "No go" theorem of Groenewold ;Exercises --The Stone-Von Neumann theorem:A heuristic argument ;The exponentiated commutation relations ;The theorem ;The Segal-Bargmann space ;Exercises --The WKB approximation:Introduction ;The old quantum theory and the Bohr-Sommerfeld condition ;Classical and semiclassical approximations ;The WKB approximation away from the turning points ;The Airy function and the connection formulas ;A rigorous error estimate ;Other approaches ;Exercises --Lie groups, Lie algebras, and representations:Summary ;Matrix Lie groups ;Lie algebras ;The matrix exponential ;The Lie algebra of a matrix Lie group ;Relationships between Lie groups and Lie algebras ;Finite-dimensional representations of Lie groups and Lie algebras ;New representations from old ;Infinite-dimensional unitary representations ;Exercises --Angular momentum and spin:The role of angular momentum in quantum mechanics ;The angular momentum operators in RÂ³ ;Angular momentum from the Lie algebra point of view ;The irreducible representations of so(3) ;The irreducible representations of SO(3) ;Realizing the representations inside LÂ²(SÂ²) --Realizing the representations inside LÂ²(MÂ³) ;Spin ;Tensor products of representations : "addition of angular momentum" ;Vectors and vector operators ;Exercises --Radial potentials and the hydrogen atom:Radial potentials ;The hydrogen atom : preliminaries ;The bound states of the hydrogen atom ;The Runge-Lenz vector in the quantum Kepler problem ;The role of spin ;Runge-Lenz calculations ;Exercises --Systems and subsystems, multiple particles:Introduction ;Trace-class and Hilbert-Schmidt operators ;Density matrices : the general notion of the state of a quantum system ;Modified axioms for quantum mechanics ;Composite systems and the tensor product ;Multiple particles : bosons and fermions ;"Statistics" and the Pauli exclusion principle ;Exercises --The path integral formulation of quantum mechanics:Trotter product formula ;Formal derivation of the Feynman path integral ;The imaginary-time calculation ;The Wiener measure ;The Feynman-Kac formula ;Path integrals in quantum field theory ;Exercises --Hamiltonian mechanics on manifolds:Calculus on manifolds ;Mechanics on symplectic manifolds ;Exercises --Geometric quantization on Euclidean space:Introduction ;Prequantization ;Problems with prequantization ;Quantization ;Quantization of observables ;Exercises --Geometric quantization on manifolds:Introduction ;Line bundles and connections ;Prequantization ;Polarizations ;Quantization without half-forms ;Quantization with half-forms : the real case ;Quantization with half-forms : the complex case ;Pairing maps ;Exercises --A review of basic material:Tensor products of vector spaces ;Measure theory ;Elementary functional analysis ;Hilbert spaces and operators on themQuantum theoryMathematicsGraduate texts in mathematics ;267.b1432463505-06-1730-05-17991003377429707536LE013 81-XX HAL11 (2013)12013000294865le013pE72.79-l- 02020.i1580954705-06-17Quantum theory for mathematicians836756UNISALENTOle01330-05-17ma -engnyu00