^{page 92 note *} We shall refer to Part I of this series of papers by simply quoting I. See these Proceedings, LXII, 1944, 40–57Google Scholar.

^{page 93 note *} For the demonstration of this theorem see , Born and , Jordan, Elementare Quantenmeckanik, Springer, 1930, § 23,Google Scholar for a single particle, and § 17 for a system of particles.

^{page 93 note †} The notion of “pure state” was used in I, section 3, in a way which did not take account of the fundamental difference between ordinary quantum mechanics and the present field theory concerning the irreducibility of the matrices. We have to correct these statements according to our present better understanding of the mathematical structure of the new theory.

^{page 94 note *} The term ἄπειρον was introduced by Anaximander of Miletos (about 550 B.C.) for the boundless and shapeless primordial matter which is the first product (arché, ἀρχή) of the creation and develops into the specific types of ordinary matter.

^{page 94 note †} The term radiation oscillator used throughout this paper differs from its current use in the minor point that we do not analyse it into simple harmonic oscillators, one for each polarisation.

^{page 95 note *} It can be seen that the application of statistical mechanics to the apeirons of a pure electron (Dirac) field leads to no canonical equilibrium.

^{page 95 note †} Here and in what follows k denotes the wave-vector of one apeiron. We regret that the same symbol has been used in I both for this and for the configuration wave-vector of the assembly of apeirons, but the context and the other symbols which occur in an equation will determine the meaning of k.

^{page 98 note *} This follows from the adiabatic principle of quantum mechanics.

^{page 93 note †} , Bergmann, Phys. Rev., LIX, 1941, 928.Google Scholar

^{page 102 note *} See, for instance, , Fowler, Statistical Mechanics, Cambridge University Press, 1936Google Scholar.