The energy of maps accompanying the collapsing of the K3 surface to a flat 3-dimensional orbifold

Abstract

We study the Dirichlet energy of some smooth maps appearing in a collapsing family of hyper-K\"ahler metrics on the K3 surface constructed by Foscolo. We introduce an invariant for homotopy classes of smooth maps from the K3 surface with a hyper-K\"ahler metric to a flat Riemannian orbifold of dimension 3, then show that it gives a lower bound of the energy. Moreover, we show that the ratio of the energy to the invariant converges to 1 for Foscolo's collapsing families.

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