Galois lines for normal elliptic space curves, II
Abstract
For each linearly normal elliptic curve C in P3, we determine Galois lines and their arrangement. The results are as follows: the curve C has just six V4-lines and in case j(C)=1, it has eight Z4-lines in addition. The V4-lines form the edges of a tetrahedron, in case j(C)=1, for each vertex of the tetrahedron, there exist just two Z4-lines passing through it. We obtain as a corollary that each plane quartic curve of genus one does not have more than one Galois point.
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