Parametrization of Maximizing Sextic Curves

Parametric Equations of Plane Sextic Curves with a Maximal Set of Singularities
S. Yu. Orevkov
Last update: July 20, 2015

Abstract We give explicit parametric equations for all irreducible plane projective sextic curves which have at most double points and whose total Milnor number is maximal (is equal to 19). In each case we find a parametrization over a number field of the minimal possible degree and try to choose coordinates so that the coefficients are as small as we can do.

abh.pdf - The Paper (Journal of Algebra and its Applications, 14(2015), no. 9, 1540013; Abhyankar Memorial Special Issue)

sextics-param.txt - The parametric equations in Maple format

The following mws files are created using Maple 9 (all the three mws files zipped are here: sextics-param-mws.zip)

a7a6a6.mws - Computations for the proof that the sextic curve with singularities A7+2A6 (no. 34) does not have a parametrization with coefficients in Q(sqrt(-7)); see Sect. 2 of the paper.

a7a4a4a2a2.mws - Computations for the proof that the sextic curve with singularities A7+2A4+2A2 (no. 36) does not have a parametrization with rational coefficients; see Sect. 2 of the paper.

a10a4a4a1.mws - Computation of the parametrization of the sextic curve with singularities A10+2A4+A1 (no. 24); see Sect. 3.3 of the paper.

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