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Field theory for function fields of singular plane quartic curves

Published online by Cambridge University Press:  17 April 2009

Kei Miura
Kei Miura
Affiliation:
Graduate School of Science and Technology, Niigata University, Niigata 950–2181, Japan e-mail: [email protected]
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Abstract

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We study the structure of function fields of plane quartic curves by using projections. Taking a point P ∈ ℙ2, we define the projection from a curve C to a line l with the centre P. This projection induces and extension field k (C)/k (ℙ1). By using this fact, we study the field extension k (C)/k (ℙ1) from a geometrical point of view. In this note, we take up quartic curves with singular points.

Type
Research Article
Information
Bulletin of the Australian Mathematical Society , Volume 62 , Issue 2 , October 2000 , pp. 193 - 204
Copyright
Copyright © Australian Mathematical Society 2000

References

[1]Iitaka, S., Ueno, K. and Namikawa, Y., Descartes no seishin to Daisûkika, (in Japanese) (Nippon Hyoron Sha, Tokyo. 1980).Google Scholar
[2]Kappe, L. and Warren, B., ‘An elementary test for the Galois group of a quartic polynomial’, Amer. Math. Monthly 96 (1989), 133137.CrossRefGoogle Scholar
[3]Miura, K. and Yoshihara, H., ‘Field theory for function fields of plane quartic curves’, J. Algebra 226 (2000), 283294.CrossRefGoogle Scholar
[4]Miura, K. and Yoshihara, H., ‘Field theory for the function field of the quintic Fermat curve’, Comm. Algebra 28 (2000), 19791988.CrossRefGoogle Scholar
[5]Namba, M., Geometry of projective algebraic curves (Marcel Dekker, New York, Basel, 1984).Google Scholar
[6]Namba, M., Branched coverings and algebraic functions, Pitman Research Notes in Mathematics 161 (Longman, Harlow, 1987).Google Scholar
[7]Serre, J.P., Topics in Galois theory (Notes written by H. Darmon), Research Notes in Mathematics 1 (Jones and Bartlett Publ., Boston, London, 1992).Google Scholar
[8]Tokunaga, H., ‘Triple coverings of algebraic surfaces according to the Cardano formula’, J. Math. Kyota Univ. 31 (1991), 359375.Google Scholar