8030 



Groups of Points. Correspondence 



Conies through several points of given curves. 



Berzolari, L. Mil. I. Lomb. Ed. 33 (1900) 



664-, 809-. 

 Constructions of 3rd and 4th degrees, by straight 



line and cubic curve. London, F. Z. Mth. 



Ps. 41 (1896) 129-. 

 Correspondence, Cremonian, in plane and space. 



Aschieri, F. Mil. I. Lomb. Bd. 14 (1881) 



21-. 

 , quadratic, between elements of 2 line 



spaces. Aschieri, F. Mil. T. Lomb. Bd. 14 



(1881) 219-. 



of 2 curves (Steiner's theorems, Crelle J. 

 1846). Padova, E. G. Mt. 5 (1867) 240-. 



on curves. Kiipper, C. Prag Sb. (1892) 

 (Mth.-Nt.) 257-. 



, formula. Brill, A. Mth. A. 7 (1874) 

 607-. 



, multiform, application to curves of 3rd 

 degree. Fries, J. de. N. Arch. Wisk. 12 

 (1886) 82-; Fschr. Mth. (1885) 629. 



of 2 points on curve. Cayley, A. L. Mth. 

 S. P. 1 (1866) No. 7, 7 pp. 



between points of 2 plane curves, special. 

 Pirondini, G. G. Mt. 38 (1900) 92-. 



of points in relation to 2 tetrahedra. Cayley, 

 A. L. Mth. S. P. 4 (1873) 396-. 



, quadratic, between 2 simply infinite systems. 

 Weyr, Em. A. Mt. 4 (1870-71) 272-. 



between straight line and curve, theorem of 

 Liiroth and Gordan. Netto, E. Mth. A. 46 

 (1895) 310-. 



of straight lines ; correspondence of points. 

 Aschieri, F. G. Mt. 13 (1875) 328-. 



systems of points on curve. Brill, A. 

 Gott. Nr. (1871) 507- ; Mth. A. 6 (1873) 

 33-. 



(1, 1) between focal cubics, metrical pro- 

 perties. Bricard, R. Par. S. Mth. Bll. 28 

 (1900) 39-. 



( , ), involutional. Genese, R. W. B. A. 

 Bp. (1881) 539. 



(1, 2), algebraic and geometric study. 

 Pittarelli, G. Bm. B. Ac. Line. Mm. 3 

 (1886) 375-. 



( , - ) on cubics with double point. 

 Pittarelli, G. Bm. B. Ac. Line. Mm. 3 

 (1886) 401-. 



(I. 4) between points on curves of surfaces 

 of 3rd degree. Waelsch, E. [1894] D. Mth. 

 Vr. Jbr. 4 (1897) 113-. 



(2, 2). Cayley, A. QJ. Mth. 11 (1871) 83-; 

 12 (1873) 197-. 



( , ), and curves of genus 1. Weyr, JB. J. 

 Wien Ak. Sb. 87 (1883) (Ab. 2) 592-. 



. ( , ) , form / (x 2 i/ 2 ) and its invariants and 

 covariants. Capelli, A. G. Mt. 17 (1879) 

 69-. 



(m, n). Retail, V. Mil. I. Lomb. Bd. 32 

 (1899) 1051-. 



Correspondences, algebraic. Brill, A. Mth. A. 



31 (1888) 374-; 36 (1890) 321-. 

 , , and the generalised principle. Hurwitz, 



A. Leip. Mth. Ps. B. 38 (1886) 10-; Mth. A. 



28 (1887) 561-. 

 , , between r points of a linear space. 



Berzolari, L. Bm. E. Ac. Line. Ed. 4 (1895) 



(Sem. 2) 148-. 



8030 



Correspondences on elliptic curves. Broden, T. 



Stockh. Ofv. (1893) 45-, 213-. 

 . Kantor, S. Tor. Ac. Sc. At. 29 



(1894) 9-. 

 , uniform. Segre, C. Tor. Ac. Sc. 



At. 24 (1889) 734-. 



between points of 2 curves. Halphen, G. H. 

 [1876] Par. S. Mth. Bll. 5 (1877) 7-. 



, symmetrical, of odd degree. Kohn, G. 



Wien Ak. Sb. 106 (1897) (Ab. 2a) 488-. 

 , uniform, between groups of p points on curve 



of genus p. Castelnuovo, G. Mil. I. Lomb. 



Ed. 25 (1892) 1189-. 

 , , hyperelliptic curves having. Kantor, S. 



Palermo Cir. Mt. Ed. 9 (1895) 65-. 

 , , singular, of harmonic elliptic curves. 



Amodeo, F. A. Mt. 19 (1891-92) 145-. 



(1, 2) and (1, 3). Piazza, S. Tor. Ac. Sc. 

 At. 17 (1881) 431-. 



(Pi P) on curves of genus p with general 

 moduli. Scorza, G. Tor. Ac. Sc. At. 35 

 (1900) 285- or 443-. 



Corresponding points on 2 curves, theorems. 



Zeuthen, H. G. [1870] Mth. A. 3 (1871) 



150-, 323-. 

 , Zeuthen's theorem. Weiss, W. 



Mth. A. 29 (1887) 382-. 

 , , deduction from. Brodtn, 



T. Stockh. Ofv. (1893) 345-. 

 Cremona transformations with fixed curves. 



Doehlemann, K. Mth. A. 39 (1891) 567-. 

 Curve, genus 0, binary forms represented on. 



Maisano, G. Palermo Cir. Mt. Ed. 1 (1887) 14-. 

 , 1, cyclic relations of points on. Gegen- 



bauer, L. Mh. Mth. Ps. 4 (1893) 330. 

 , 3, and uniform functions of 2 variables. 



Picard, E. C. E. 93 (1881) 835-. 

 , p, 2q points on, problem. Ptaszycki, J. 



C. E. 130 (1900) 105-. 

 Curves, any genus, linear systems. Jung, G. 



[1887] A. Mt. 15 (1887-88) 277-. 

 , genus 0, algebraic forms in theory. Igel, 



B. Wien Ak. Sb. 89 (1884) (Ab. 2) 218-. 

 _, , families. Lerch, M. Mh. Mth. Ps. 2 



(1891) 465-. 

 , 1. Humbert, G. C. E. 97 (1883) 989-, 



1042-, 1136-. 



, . Schlesinger, 0. C. B. 107 (1888)224-. 



, , involutions on. Weyr, E. Wien 



Ak. Sb. 101 (1892) (Ab. 2a) 1506-. 

 , , , and Steiner's polygons. Weyr, 



E. Wien Ak. Sb. 101 (1892) (Ab. 2a) 1457-, 



, , parametric representation. Duarte 



Leite, . G. Teix. J. Sc. 9 (1889) 3-; Fschr. 



Mth. (1888) 716. 

 , , symbolical calculus on. Czuber, E. 



[1894] D. Mth. Vr. Jbr. 4 (1897) 100-. 

 , , . Weyr, E. Wien Ak. Sb. 



193 (1894) (Ab. 2a) 365-. 

 , , systems. Martinetti, V. Mil. I. 



Lomb. Bd. 20 (1887) 264-, [854]. 

 , >1, hyperelliptic. K-ilpper, K. Prag Sb. 



(1896) (Mth.-Nt.) No. 43, 11 pp. 

 t 2, proof of theorem. Esclaibes, (le rev. 



pere) d\ (xn) Brux. S. Sc. A. 5 (1881) 



(Pt. 2) 34-. 



VOL. I. 



561 



