A Liouville theorem for some asymptotically conical Calabi-Yau manifolds

Abstract

Let (C, JC, ωC, gC) be a Calabi-Yau cone and (M, J, ω, g) an open Ricci-flat Kähler manifold. We show that, if there exists a diffeomorphism Φ: C B1(o) → M K, for some compact K ⊂ M, such that Φ*J is asymptotic to JC and C-1 ωC ≤ Φ* ω≤ C ωC for some C ≥ 1, then (M, g) is asymptotically conical (AC) with tangent cone at infinity given by (C, dgC). As a consequence, we obtain that any Ricci-flat Kähler metric on T*Sn which is quasi-isometric to the Stenzel metric must be equal to the Stenzel metric up to scaling and diffeomorphism. Similarly, any Ricci-flat Kähler metric on OP1(-1)2 which is quasi-isometric to the Candelas-De la Ossa metric must be equal to the Candelas-De la Ossa metric up to scaling and diffeomorphism. This provides new examples of complete Calabi-Yau manifolds for which a Liouville-type theroem holds.