* Castelnuovo, G.Rend. Accad. Lincei, (5) 3 (1894)₁, 473Google Scholar; Memorie scelte (Bologna, 1937), p. 233.Google Scholar

† A variety V _r is unirational if it is representable on an involution I _ν of S _r; it is birational if ν = 1.

‡ Roth, L., Rend. Accad. Lincei, (8) 9 (1950), 62.Google Scholar

* A familiar example is the V ₃ which is the complete intersection of a quadric and a cubic primal of [5]; this contains two systems of plane cubics, which can be separated only in an extension of the original field.

† The importance of this character is evident from Enriques's observation that, in general, it is impossible to lower the order of a given system of elliptic curves by means of rational processes.

‡ It follows from the concluding remark of § 1 that, since the curves C invade V _r, the points Q must likewise do so; hence there cannot be fewer than ∞^r−1 curves V ₁, (P).

* Consider, for instance, a cubic primal of [4] and the system of plane sections which pass through a point P of the primal and which meet a fixed line. In this case the locus V ₂(P) has a node at P.

* As in § 2, there cannot be fewer than ∞^r−1 curves V ₁.

* This method was suggested by an analogous device used in a paper by Segre, B.: Colloque international d'algèbre et de théorie des nombres (Paris, 1949), p. 135.Google Scholar

* Castelnuovo, G.-Enriques, F., Ann. Ecole Norm. Sup. (3), 22 (1906), 339.CrossRefGoogle Scholar