8030 



Principle of Correspondence 



8030 



application to analytical solutions. Saltel, L. 

 C. E. 82 (1876) 324-. 



to finding class of evolute and caustic 

 of curve. Chasles, M. C. E. 72 (1871) 

 394-. 



degree of envelope of curve or surface. 



Saltel, L. C. E. 83 (1876) 608-. 

 locus defined by algebraic con- 

 ditions. Saltel, L. C. E. 82 (1876) 63- ; 83 



(1876) 529-. 

 number of points of intersection of 



2 curves. Chasles, M. C. E. 75 (1872) 736- ; 



76 (1873) 126-. 

 3 surfaces, or of 



skew curve with a surface. Fouret, G. (rx) 



Par. S. Mth. Bll. 1 (1873) 122-, 258-. 

 plane in which 3 curves 



of 3 given systems touch. Fouret, G. Par. 



S. Mth. Bll. 5 (1877) 130-. 

 solutions of n algebraic equations 



in n unknowns. Fouret, G. C. E. 78 (1874) 



183-. 

 , new developments due to. Saltel, L. Brux. 



Ac. Bll. 45 (1878) 102-. 



to proof of Bezout's theorem. Saltel, L. 

 C. E. 81 (1875) 884-. 



segments. Chasles, M. C. E. 83 (1876) 



467-, 495-, 519-. 



on tangents. Chasles, M. C. E. 81 



(1875) 253-. 



Cayley and Brill's. Zeuthen, H. G. Mth. A. 

 40 (1892) 99-. 



character. Chasles, M. C. E. 78 (1874) 577-. 



Chasles's, analytical extension. Saltel, L. C. 

 E. 80 (1875) 1064-. 



complementary theorem applied to determina- 

 tion, without calculation, of order of multi- 

 plicity of point on given locus. Saltel, L. 

 C. E. 81 (1875) 1047-. 



definition, and applications. Saltel, L. [1879] 

 Bordeaux S. Sc. Mm. 4 (1882) 1-. 



degree of multiplicity of solutions, and appli- 

 cation to Pliicker's relations. Zeuthen, H. 

 G. N. A. Mth. 6 (1867) 200-. 



generalisation, applied to elimination. Saltel, 

 L. N. A. Mth. 12 (1873) 565-. 



generalised. Bobek, K. Wien Ak. Sb. 93 

 (1886) (Ab. 2) 899-. 



for groups of n points and n rays. Schubert, 

 H. C. H. Mth. A. 12 (1877) 180-. 



and law of decomposition applied to skew 

 curves, in particular to locus of centres of 

 osculating spheres of given skew curve. 

 Saltel, L. Brux. Ac. Bll. 43 (1877) 266-. 



of plane and space. Zeuthen, H. G. C. E. 78 

 (1874) 1553-. 



and systems of curves. Segre, C. Bb. Mth. 

 (1892) 33-. 



theory of characteristics. Legoux,A. Toul. 

 Ac. Sc. Mm. 8 (1886) 208-. 



of 2 variables. Chasles, M. C. E. 41 (1855) 

 1097-. 



Protective generation of groups of curves 

 C*+". Kilpper, K. Prag Sb. (1897) (Mth.- 

 Nt.) No. 5, 15 pp. 



Projective properties of curves. Juel, C. [1899] 

 Kjtfb. Dn. Vd. Selsk. Skr. 10 (1899-1902) 

 1-. [With French resuml.] 



Eational curve, plane, 3rd degree, representa- 

 tion on conic. Weyr, E. J. Wien Ak. Sb. 

 79 (1879) (Ab. 2) 429-. 



, skew, 4th degree. Rohn, K. Leip. 

 Mth. Ps. B. 42 (1890) 208- ; 43 (1891) 1-. 



, , , automorphic transforma- 

 tion. Brambilla, A. Mil. I. Lomb. Ed. 20 

 (1887) 780-. 



, , , harmonic centre of "quad- 

 ruple" given by. Weyr, E. J. Wien Ak. 

 Sb. 81 (1880) (Ab. 2) 1218-. 



, , , representation on conic. 

 Weyr, E. J. [1875-76] Wien Ak. Sb. 72 

 (1876) (Ab. 2) 686-; 73 (1876) (Ab. 2) 203-. 



curves. Davis, E. W. J. H. Un. Cir. [3] 

 (1884) 123. 



with double point or cusp, Abel's theorem. 



Johansson, N. A. Fschr. Mth. (1885) 405. 



in 7i-flat space. Bissing, G. J. H. Un. 

 Cir. [3] (1884) 123. 



, generation. Jonquieres, E. de. C. E. 



105 (1887) 1148-. 

 , plane. Weyr, E. Casopis 8 (*1879) 



193- ; Fschr. Mth. (*1879) 488. 



, , representations on one another. 

 Weyr, E. J. Wien Az. 15 (1878) 228-. 



, , degrees n and n-3, intersections. 



Fabry, E. Par. EC. Norm. A. 13 (1896) 



107-. 

 , skew, singularities of 2nd order. Weyr, 



Em. A. Mt. 4 (1870-71) 328-. 

 Eeducible curves. Noether,M. Erlang. Ps. Md. 



S. Sb. 17 (1885) 13-; Acta Mth. 8 (1886) 161-. 

 Eesiduation in regard to curve of 3rd degree. 



Cayley, A. [1873] (vn) Mess. Mth. 3 (1874) 



62-. 



theorem (intersections of plane curves at 

 multiple points). Macaulay, F. S. L. Mth. 

 S. P. 31 (1900) 381-. 



, Noether's theorem, and the Eiemann- 



Eoch theorem. Macaulay, F. S. [1899] 



L. Mth. S. P. 31 (1900) 15-. 

 Eesidues in canonical series of adjoint curves 



of degree m-3-a. Amodeo, F. Em. E. 



Ac. Line. Ed. 2 (1893) (Sem. 1) 528-. 



relative to asymptotes. Quadrature of curves 

 dependent on genus. Marie, M. C. E. 76 

 (1873) 943-. 



Singular points. PlUcker, J. [1836] Liouv. J. 



Mth. 2 (1837) 11-. 

 and tangents, influence on degree and 



class of plane curves, tazarski, M. Krk. 



Ak. (Mt.-Prz.) Ez. 15 (1887) 278-; Fschr. 



Mth. (1887) 607. 

 Singularities of plane curves, higher. Smith, 



H. J. S. L. Mth. S. P. 6 (1874-75) 153-. 

 , and new species of curve. Brill, 



A. [1879] Mth. A. 16 (1880) 348-. 

 Skew curve, 4th degree, with double point, 



representation on conic. Weyr, E. J. [1878] 



Wien Ak. Sb. 78 (1879) (Ab. 2) 891-. 

 , , property of 9 points, etc. Petot, 



A. C. E. 98 (1884) 1245-. 

 , 5th degree, genus 1. Montesano, D. 



Nap. Ed. 27 (1888) 181-. 



565 



