On osculating systems of differential equations of type $(N,\,1,\,2)$
Source: Nagoya Math. J. Volume 31 (1968), 251-278.
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Links and Identifiers
 L. Chow, On compact analytic varieties, Amer. Jour. Math. 71 (1947).
 G.H. Halphen, Traite desfunctions elliptiques II, (1888), Paris.
 S. Lang, Introduction to algebraic geometry, (1958), New York.
Mathematical Reviews (MathSciNet): MR20:7021
 S. Lefschetz, Differential equations geometric theory, (1957), New York.
Mathematical Reviews (MathSciNet): MR20:1005
 H. Morikawa, On the defining equations of abelian varieties Nagoya Math. Jour. Vol. 30 (1967).
 R J. Walker, Algebraic Curves, (1949). Institute ofMathematics Nagoya University 10) This means that theZariski closure of a projective solution for a system with constant coefficients is a Zariski closure of a commutative algebraic group.