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A family of elliptic curves and cyclic cubic field extensions*

Published online by Cambridge University Press:  24 October 2008

E. Thomas  and
A.T. Vasquez
E. Thomas
Affiliation:
Department of Mathematics, University of California, Berkeley, CA 94720
A.T. Vasquez
Affiliation:
Graduate School CUNY, 33W. 42nd St., New York, NY 10036
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Extract

Let K be a field with char K ≡ 2,3. We consider the problem of finding rational points over K on the family of elliptic curves Fλ, given in homogeneous coordinates (over ) by

Type
Research Article
Information
Mathematical Proceedings of the Cambridge Philosophical Society , Volume 96 , Issue 1 , July 1984 , pp. 39 - 43
Copyright
Copyright © Cambridge Philosophical Society 1984

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References

[1] Caldwell, C.. Thesis, University of California (Berkeley), 1984.Google Scholar
[2] Craig, M.. Integer values of H(x*/yz). J. Number Theory 10 (1978), 6263.CrossRefGoogle Scholar
[3] Dofs, E.. On some classes of homogeneous ternary cubic diophantine equations. Ark. Mat. 13 (1975), 2972.CrossRefGoogle Scholar
[4] Hubwitz, A.. Über ternare diophantische Gleichungen dritten Grades. Math. Werke, 2 (Birk-hauser, 1933), 446468.Google Scholar
[5] Milnor, J. and Stasheff, J.. Characteristic classes. Annals of Math. Studies, vol. 76 (Princeton University Press, 1974).CrossRefGoogle Scholar
[6] Mordell, L.. Diophantine Equations. (Academic Press, 1969).Google Scholar
[7] Mordell, L.. On the rational solutions of the indeterminate equations of the 3rd and 4th degree. Proc. Cambridge Philos. Soc. 21 (1922), 179192.Google Scholar
[8] Mordell, L.. The diophantine equation x3 + y3 + z3 + kxyz = 0. Colloque sur la thiorie des nombres (Bruxelles, 1955), 6776.Google Scholar
[9] Thomas, E. and Vasqtjez, A.. Diophantine equations arising from cubic number fields. J. Number Theory 13 (1981), 398414.CrossRefGoogle Scholar
[10] Weil, A.. L'arithmetique sur les courbes algébriqes. Acta Math. 52 (1929), 281315.Google Scholar