Brill-Noether general K3 surfaces with the maximal number of elliptic pencils of minimal degree

Abstract

We explicitly construct Brill--Noether general K3 surfaces of genus 4,6 and 8 having the maximal number of elliptic pencils of degrees 3, 4 and 5, respectively, and study their moduli spaces and moduli maps to the moduli space of curves. As an application we prove the existence of Brill--Noether general K3 surfaces of genus 4 and 6 without stable Lazarsfeld--Mukai bundles of minimal c2.