Galois lines for a canonical curve of genus 4, III: non-cyclic Galois lines

Abstract

Let C ⊂ P3 be a canonical curve of genus 4 over an algebraically closed field k of characteristic zero. For a line l ⊂ P3, we consider the projection πl: C P1 from l and the induced extension of function fields πl*: k(P1) k(C). A line l is called an S3-line (resp. a K4-line) if the extension k(C)/πl*(k(P1)) is Galois and its Galois group is isomorphic to the symmetric group S3 on three letters (resp. the Klein four-group K4). We prove that the number of S3-lines (resp.\ K4-lines) is at most 10 (resp.\ 15).