The Kummer Construction of Calabi-Yau and Hyper-K\"ahler Metrics on the K3 Surface, and Large Families of Volume Non-collapsed Limiting Compact Hyper-K\"ahler Orbifolds

Abstract

Right after Yau's resolution of the Calabi conjecture in the late 1970s, physicists Page and Gibbons-Pope conjectured that one may approximate Ricci-flat K\"ahler metrics on the K3 surface with metrics having "almost special holonomy" constructed via "resolving" the 16 orbifold singularities of a flat T4/Z2 with Eguchi-Hanson metrics. Constructions of such metrics with special holonomy from such a "gluing" construction of approximate special holonomy metrics have since been called "Kummer constructions" of special holonomy metrics, and their proposal was rigorously carried out in the 1990s by Kobayashi and LeBrun-Singer, and in the 2010s by Donaldson. In this paper, we provide two new rigorous proofs of Page-Gibbons-Pope's proposal based on singular perturbation and weighted function space analysis. Each proof is done from a different perspective: * solving the complex Monge-Ampere equation (Calabi-Yau) * perturbing closed definite triples (hyper-K\"ahler) Both proofs yield Eguchi-Hanson metrics as ALE bubbles/rescaled limits. Moreover, our analysis in the former perspective yields estimates which improve Kobayashi's estimates, and our analysis in the latter perspective results in the construction of large families of Ricci-flat K\"ahler metrics on the K3 surface, yielding the full 58 dimensional moduli space of such. Finally, as a byproduct of our analysis, we produce a plethora of large families of compact hyper-K\"ahler orbifolds which all arise as volume non-collapsed Gromov-Hausdorff limit spaces of the aforementioned constructed large families of Ricci-flat K\"ahler metrics on the K3 surface. Moreover, these compact hyper-K\"ahler orbifolds are explicitly exhibited as points in the "holes" of the moduli space of Ricci-flat K\"ahler-Einstein metrics on K3 under the period map.