Polarized K3 surfaces with an automorphism of order 3 and low Picard number

Abstract

In this paper, for each d>0, we study the minimum integer h3,2d∈ N for which there exists a complex polarized K3 surface (X,H) of degree H2=2d and Picard number (X):=rank Pic X = h3,2d admitting an automorphism of order 3. We show that h3,2∈\ 4,6\ and h3,2d=2 for d>1. Analogously, we study the minimum integer h*3,2d∈ N for which there exists a complex polarized K3 surface (X,H) as above plus the extra condition that the automorphism acts as the identity on the Picard lattice of X. We show that h*3,2d is equal to 2 if d>1 and equal to 6 if d=1. We provide explicit examples of K3 surfaces defined over Q realizing these bounds.