KSBA compactification of the moduli space of K3 surfaces with purely non-symplectic automorphism of order four

Abstract

We describe a compactification by KSBA stable pairs of the five-dimensional moduli space of K3 surfaces with purely non-symplectic automorphism of order four and U(2) D42 lattice polarization. These K3 surfaces can be realized as the minimal resolution of the double cover of P1×P1 branched along a specific (4,4) curve. We show that, up to a finite group action, this stable pair compactification is isomorphic to Kirwan's partial desingularization of the GIT quotient (P1)8//SL2 with the symmetric linearization.