1. Math. Annalen79 (1919), S. 282?312.

2. Crelles Journal70 (1869), S. 46?70. See also R. Lipschitz (Crelle70, 72) and later writers.

3. The namesaffine normal tensors andmetric normal tensors in place ofnormal tensors andmetric tensors respectively as used in my paper: Math. Zeitschr.25 (1926), S. 714 would seen to be more appropriate, but inasmuch as the latter designations have also appeared in the literature and are more brief than the former we shall use this terminology.

4. For the most part these theorems and equations are to be found in The Geometry of Paths by O. Veblen and T. Y. Thomas, Trans. Am. Math. Soc.25 (1923), pp. 551?608; there is also a supplementary note, Extensions of relative tensors, ibid.26 (1924), pp. 373?377. The first part of the former of these papers is largely based on a series of notes by Eisenhart and Veblen in vol. 8 of the Proceedings of the National Academy of Sciences. Reference may also be had to the recent Cambridge tract by O. Veblen, Invariants of quadratic differential forms, Nr. 24. See also T. Y. Thomas and A. D. Michal, Differential invariants of affinely connected manifolds, Annals of Math.28 (1927), pp. 196?236; also, Differential invariants of relative quadratic differential forms, ibid.28 (1927) pp. 631?688. The metric tensors appear by implication, at least, in the paper by E. Noether, Invarianten beliebiger Differential-ausdr�cke, G�ttinger Nachrichten25 (1918).

5. Math. Zeitschr.25 (1926), S. 714?722.