An analytical characterization of Eguchi-Hanson space and its higher-dimensional analogs
Abstract
Let (M,g) be a complete 4-dimensional Ricci-flat ALE orbifold with finitely many orbifold points and group at infinity Z2. We prove that if the L2 kernel of its Lichnerowicz Laplacian has dimension at most 3, then (M,g) is either the Eguchi-Hanson space or the flat orbifold R4/Z2. A similar uniqueness result is proved for Calabi's higher-dimensional analogs of the Eguchi-Hanson space among Ricci-flat K\"ahler ALE orbifolds with group at infinity Zm.
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