Points algébriques de degrés au plus $5$ sur la courbe C d'équation affine y^{2}= 4x^{5}+1

Abstract
In this work, we determine the set of algebraic points of degree at most Q over on the curve C given by the affine equation y^{2}= 4x^{5}+1. This result extends a result of Andrew R. Booker, Jeroen Sijsling, Andrew V. Sutherland, John Voight and Dan Yasak who described in [1] the set of rational points on this curve

Keywords
Planes curves - Degree of algebraic points - Rationals points - Algebraic extensions - Jacobian-Linear system

Cite this paper
EL Hadji SOW, Moussa FALL, Oumar SALL, Points algébriques de degrés au plus $5$ sur la courbe C d'équation affine y^{2}= 4x^{5}+1 , SCIREA Journal of Mathematics. Volume 6, Issue 6, December 2021 | PP. 73-86. 10.54647/mathematics11300

References

[ 1 ]	Andrew R. Booker, Jeroen Sijsling, Andrew V. Sutherland, John Voight and Dan Yasak, (2016). A database of genus-2 curves over the rational numbers. LMS Journal of Computation and Mathematics, 19(A), 235-254.
[ 2 ]	P. A. Griffiths, Introduction to algebraic curves, Translations of mathematical monographs volume 76. American Mathematical Society, Providence (1989).
[ 3 ]	The LMFDB Collaboration, The L-functions and Modular Forms Database. Available at: http://www.lmfdb.org. [Online; accessed 8 November 2021]
[ 4 ]	O. Sall, Points algébriques sur certains quotients de courbes de Fermat, C. R. Acad. Sci. Paris Ser. I 336 (2003) 117-120.
[ 5 ]	O. Sall, M. Fall, C. M. Coly, Points algébriques de degré donné sur la courbe d'équation affine , International Journal Of Development Research Vol. 06, Issue, 11, pp. 10295-10300, November, 2016.