Birational properties of some moduli spaces related to tetragonal curves of genus 7

Abstract

Let M_{7,n} be the (coarse) moduli space of smooth curves of genus 7 with n marked points defined over the complex field. We denote by M^1_{7,n;4} the locus of points inside M_{7,n} representing curves carrying a g^1_4. It is classically known that M^1_{7,n;4} is irreducible of dimension 17+n. We prove in this paper that M^1_{7,n;4} is rational for 0<= n <= 11.Comment: 20 pages; in the second version we replaced the previous Lemma 4.3 by Lemma 4.5, and fixed the proof of the rationality of the moduli space of unpointed tetragonal genus 7 curves in section 4. Hans-Christian von Bothmer as further author adde