Isogenies between K3 surfaces of the Ap\'ery-Fermi pencil

Abstract

Elliptic fibrations of K3 surfaces belonging to the Ap\'ery-Fermi pencil (Yk) may have 2 or 3-torsion sections defining on (Yk) automorphisms τ of order 2 or 3. First we consider Yk/τ \ for some fibrations of the singular K3 surface Y10 in the case of two-torsion sections and obtain as for the singular surface Y2 either the Kummer surface associated to Y10 or Y10 itself. This last case is associated with the complex multiplication on Y10. We prove also that for all the fibrations of Y2 with 3-torsion sections Y2/τ=Y10. Results are different for Y10 where we can obtain for Y10/τ one of the two surfaces with transcendental lattice [4 0 18] or [2 0 36]. We also explicitly link 3-isogeny on a fibration and base change on other fibrations.