^{page 84 note 1} See Titchmarsh, , op. cit., p. 37.Google Scholar

^{page 84 note 2} The corresponding theorem for cosine integrals is also true, and may be proved in the same way.

^{page 85 note 1} This theorem on integration by parts is due to G. H. Hardy in the case of integral r. See Cossar, J., Journal London Math. Soc., 16 (1941), 56.CrossRefGoogle Scholar

^{page 87 note 1} If, in (a, b), F is a bounded positive decreasing function and G (possibly complex) is integrable, then there is ξ (a ≦ ξ ≦ b) such that

.

^{page 90 note 1} The convergence of the expressions denoted by I ₁ and I ₂ will become apparent later. The same remark applies to several of the expressions Iⁿ that follow.

^{page 90 note 2} If p = – 1, I ₃ = 0.

^{page 92 note 1} SeeProc. London Math. Soc. (2), 48 (1944), 292–309.Google Scholar