Volume 1 Basic Geometrical Optics
CLASSICAL MECHANICS
- Relativistic Kinematics
- The Lorentz equation and general
- considerations
- Conservation of energy
- The acceleration potential
- Definition of coordinate systems
- Conservation of axial angular momentum
- Different Forms of Trajectory Equations
- Parametric representation in terms of the arc-length
- Relativistic proper-time representation
- The cartesian representation
- Scaling rules
- Variational Principles
- The Lagrange formalism
- General rotationally symmetric systems
- The canonical formalism
- The time-independent form of the
- variational principle
- Static rotational ly symmetric systems
- Hamiltonian Optics
- Introduction of the characteristic function
- The Hamilton-Jacobi equation
- The analogy with light optics
- The influence of vector potentials
- Gauge transformations
- Poincare’s integral invariant
- The problem of uniqueness
CALCULATION OF STATIC FIELDS
- Basic Concepts and Equations
- Series Expansions
- Boundary-Value Problems
- Integral Equations
- The Boundary-Element Method
- The Finite-Difference Method (FDM)
- The Finite-Element Method (FEM)
- Field-Interpolation Techniques
THE PARAXlAL APPROXIMATION
- Introduction
- Systems with an Axis of Rotational Symmetry
- Gaussian Optics of Rotationally Symmetric Systems: Asymptotic Image Formation
- Gaussian Optics of Rotationally Symmetric Systems: Real Cardinal Elements
- Electron Mirrors
- Quadrupole Lenses
- Cylindrical Lenses
ABERRATIONS
- Introduction
- Perturbation Theory: General Formalism
- The Relation Between Permitted Types of Aberration and System Symmetry
- The Geometrical Aberrations of Round Lenses
- Asymptotic Aberration Coefficients
- Chromatic Aberrations
- Aberration Matrices and the Aberrations of Lens Combinations
- The Aberrations of Mirrors and Cathode Lenses
- The Aberrations of Quadrupole Lenses and Octopoles
- The Aberrations of Cylindrical Lenses
- Parasitic Aberrations
DEFLECTION SYSTEMS
- Deflection Systems and their Aberrations
COMPUTER-AIDED ELECTRON OPTICS
- Numerical Calculation of Trajectories, Paraxial Properties and Aberrations
- The Use of Computer Algebra Languages