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\(\S1\) Quantization of Schrodinger Field
\(\S2\) Some-mathematical-preparation
\(\S3\) The Physical Interpretation of States in Number Representation
\(\S4\) Bosons and Fermions
\(\S5\) S Matrix in Interaction Picture
\(\S6\) Normal Products and Matrix Elements
\(\S7\) Green Function for Schrodinger equation
\(\S8\) Potential Scattering Cross Section
\(\S9\) Vector-spaces for quantum-mechanics
\(\S10\)Fundamental Concepts in Vector Spaces-Linear Functionals, Linear Operators
\(\S11\) Fundamental Concepts in Vector Spaces-Basic Definitions
\(\S12\) S matrix in first order
\(\S13\)S-Matrix
\(\S14\)Scattering from external source -Schrodinger Field
\(\S15\)Examples of Normal Product
\(\S15\)Problem session
\(\S16\)Simultaneous eigenvectors as basis
\(\S17\)Normal Products, Matrix Element
\(\S18\)Physical Interpretation of States and Operators
\(\S19\)Physical Interpretation of Particle Number States
\(\S20\)Connection with Quantum Mechanics
\(\S21\)Second Quantized Theory of Fermions
\(\S22\)Quantization of Schrodinger Field
\(\S23\)Reinterpretation of Wave Equation
\(\S24\)Classical Schrodinger Field
\(\S25\)Canonical Quantization of Schrodinger Field
\(\S26\)Physical Interpretation of Particle Number States
\(\S27\)Simultaneous eigenvectors as basis
\(\S28\)Summary of properties of$a_k,a^\dagger_k,N_k$
\(\S29\)Commutation properties of $a_k,a^\dagger_k,N_k$
\(\S30\)Definition of Operators $a_k,a^\dagger_k,N_k$
\(\S31\)Hilbert Space and Physical Interpretation
\(\S32\)Some Mathematical Preparation
