From Wikipedia, the free encyclopedia

In algebraic geometry, a Coble curve is an irreducible degree-6 planar curve with 10 double points (some of them may be infinitely near points). They were studied by Arthur Coble ( 1919, 1982).

See also

References

  • Coble, Arthur B. (1919), "The Ten Nodes of the Rational Sextic and of the Cayley Symmetroid", American Journal of Mathematics, 41 (4), The Johns Hopkins University Press: 243–265, doi: 10.2307/2370285, ISSN  0002-9327, JSTOR  2370285
  • Coble, Arthur B. (1982) [1929], Algebraic geometry and theta functions, American Mathematical Society Colloquium Publications, vol. 10, Providence, R.I.: American Mathematical Society, ISBN  978-0-8218-1010-1, MR  0733252
From Wikipedia, the free encyclopedia

In algebraic geometry, a Coble curve is an irreducible degree-6 planar curve with 10 double points (some of them may be infinitely near points). They were studied by Arthur Coble ( 1919, 1982).

See also

References

  • Coble, Arthur B. (1919), "The Ten Nodes of the Rational Sextic and of the Cayley Symmetroid", American Journal of Mathematics, 41 (4), The Johns Hopkins University Press: 243–265, doi: 10.2307/2370285, ISSN  0002-9327, JSTOR  2370285
  • Coble, Arthur B. (1982) [1929], Algebraic geometry and theta functions, American Mathematical Society Colloquium Publications, vol. 10, Providence, R.I.: American Mathematical Society, ISBN  978-0-8218-1010-1, MR  0733252

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