From Wikipedia, the free encyclopedia

In algebraic geometry, the Schottky–Klein prime form E(x,y) of a compact Riemann surface X depends on two elements x and y of X, and vanishes if and only if x = y. The prime form E is not quite a holomorphic function on X × X, but is a section of a holomorphic line bundle over this space. Prime forms were introduced by Friedrich Schottky and Felix Klein.

Prime forms can be used to construct meromorphic functions on X with given poles and zeros. If Σniai is a divisor linearly equivalent to 0, then ΠE(x,ai)ni is a meromorphic function with given poles and zeros.

See also

References

  • Fay, John D. (1973), "The prime- form", Theta functions on Riemann surfaces, Lecture Notes in Mathematics, vol. 352, Berlin, New York: Springer-Verlag, doi: 10.1007/BFb0060090, ISBN  978-3-540-06517-3, MR  0335789
  • Baker, Henry Frederick (1995) [1897], Abelian functions, Cambridge Mathematical Library, Cambridge University Press, ISBN  978-0-521-49877-7, MR  1386644
  • Mumford, David (1984), Tata lectures on theta. II, Progress in Mathematics, vol. 43, Boston, MA: Birkhäuser Boston, doi: 10.1007/978-0-8176-4578-6, ISBN  978-0-8176-3110-9, MR  0742776


From Wikipedia, the free encyclopedia

In algebraic geometry, the Schottky–Klein prime form E(x,y) of a compact Riemann surface X depends on two elements x and y of X, and vanishes if and only if x = y. The prime form E is not quite a holomorphic function on X × X, but is a section of a holomorphic line bundle over this space. Prime forms were introduced by Friedrich Schottky and Felix Klein.

Prime forms can be used to construct meromorphic functions on X with given poles and zeros. If Σniai is a divisor linearly equivalent to 0, then ΠE(x,ai)ni is a meromorphic function with given poles and zeros.

See also

References

  • Fay, John D. (1973), "The prime- form", Theta functions on Riemann surfaces, Lecture Notes in Mathematics, vol. 352, Berlin, New York: Springer-Verlag, doi: 10.1007/BFb0060090, ISBN  978-3-540-06517-3, MR  0335789
  • Baker, Henry Frederick (1995) [1897], Abelian functions, Cambridge Mathematical Library, Cambridge University Press, ISBN  978-0-521-49877-7, MR  1386644
  • Mumford, David (1984), Tata lectures on theta. II, Progress in Mathematics, vol. 43, Boston, MA: Birkhäuser Boston, doi: 10.1007/978-0-8176-4578-6, ISBN  978-0-8176-3110-9, MR  0742776



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