On the variety of tritangential planes to a general K3 surface of degree 6 and genus 4 in 4

Abstract

Let S⊂ 4 be a general K3 surface of degree 6 and genus 4. In this paper we study the irreducible variety XS of tritangential planes to S whose general point is a plane that intersects S in a curvilinear scheme of length six supported at three non collinear points. The variety XS can be identified as the relevant part of the fixed locus of the so called Beauville involution defined on the Hilbert scheme S[3] of 0--dimensional schemes of length three of S. In this paper we prove that: (a) XS has dimension 3, is irreducible and smooth, except for 210 points that are at most of multiplicity 2 for XS; (b) XS, in its natural embedding in the Grassmannian G(2,4)⊂ 9 of planes in 4, has degree 152.