Hermitian-Yang-Mills connections on collapsing elliptically fibered K3 surfaces
Abstract
Let X→ P1 be an elliptically fibered K3 surface, admitting a sequence ωi of Ricci-flat metrics collapsing the fibers. Let V be a holomorphic SU(n) bundle over X, stable with respect to ωi. Given the corresponding sequence i of Hermitian-Yang-Mills connections on V, we prove that, if E is a generic fiber, the restricted sequence i|E converges to a flat connection A0. Furthermore, if the restriction V|E is of the form j=1n OE(qj-0) for n distinct points qj∈ E, then these points uniquely determine A0.
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