(Volume II).- IX Representation of Hilbert Spaces by Function Spaces.- X Equations of Motion.- XI The Spectrum of One-Electron Systems.- XII Spectrum of Two-Electron Systems.- XIII Selection Rules and the Intensity of Spectral Lines.- XIV Spectra of Many-Electron Systems.- XV Molecular Spectra and the Chemical Bond.- XVI Scattering Theory.- XVII The Measurement Process and the Preparation Process.- XVIII Quantum Mechanics, Macrophysics and Physical World Views.- Appendix V Groups and Their Representations.- 1 Groups.- 2 Cosets and Invariant Subgroups.- 3 Isomorphisms and Homomorphisms.- 4 Isomorphism Theorem.- 5 Direct Products.- 6 Representations of Groups.- 7 The Irreducible Representations of a Finite Group.- 8 Orthogonality Relations for the Elements of Irreducible Representation Matrices.- 9 Representations of the Symmetric Group.- 10 Topological Groups.- 10.1 The Species of Structure: Topological Group.- 10.2 Uniform Structures of Groups.- 10.3 Lie Groups.- 10.4 Representations of Topological Groups.- 10.5 Group Rings of Compact Lie Groups.- 10.6 Representations in Hilbert Space.- 10.7 Representations up to a Factor.- References.

In this second volume on the Foundations of Quantum Mechanics we shall show how it is possible, using the methodology presented in Volume I, to deduce some of the most important applications of quantum mechanics. These deductions are concerned with the structures of the microsystems rather than the technical details of the construction of preparation and registration devices. Accordingly. the only new axioms (relative to Volume I) which are introduced are concerned with the relationship between ensemble operators W, effect operators F, and certain construction principles of the preparation and registration devices. The applications described here are concerned with the measurement of atomic and molecular structure and of collision experiments. An additional and essential step towards a theoretical description of the preparation and registration procedures is carried out in Chapter XVII. Here we demonstrate how microscopic collision processes (that is, processes which can be described by quantum mechanics) can be used to obtain novel preparation and registration procedures if we take for granted the knowledge of only a few macroscopic preparation and registration procedures. By clever use of collision processes we are often able to obtain very precise results for the operators Wand F which describe the total procedures from a very imprecise knowledge of the macroscopic parts of the preparation and regis­ tration processes. In this regard experimental physicists have done brilliant work. In this sense Chapter XVII represents a general theoretical foundation for the procedures used by experimental physicists.