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On multiple curves. III.

Published online by Cambridge University Press:  24 October 2008

W. V. D. Hodge
Affiliation:
Pembroke CollegeCambridge

Extract

A curve Γ has been defined as a normal multiple of a curve C if it contains an involution In, of order n, which has the properties: (1) the sets of In are in (1–1) correspondence with the points of C; (2) each set In consists of n points which are distinct in the birational sense; (3) In is generated by an Abelian group G of order n of birational transformations of Γ into itself. We shall denote the field of complex numbers by k, the function field of C by k(C), and the function field of Γ by k(Γ). Conditions (1) and (3) imply that k(Γ) is a commutative normal (i.e. Galois) extension of k(C). The object of this note is to show how, given the curve C and the Abelian group G of order n, we can construct a curve Γ with the properties (1), (2), (3).

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 1946

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References

* Hodge, W. V. D., ‘On Multiple Curves, I’, Proc. Cambridge Phil. Soc. 41 (1945).Google Scholar

Cf. Bliss, G. A., Algebraic Functions (American Math. Soc. Colloquium Publication, 1933), p. 112.Google Scholar

Comessatti, A., Rend. Sem. Mat. Padova, 1 (1930), 1.Google Scholar

* Cf. Baker, H. F., Abel's Theorem and the Allied Theory, Cambridge (1897). Chap. XIII.Google Scholar

Albert, A. A., Modern Higher Algebra (Chicago, 1936), 185.Google Scholar

* A. A. Albert, loc. cit. p. 169.