Ricci-flat manifolds of generalized ALG asymptotics
Abstract
In complex dimensions ≥ 3, we provide a geometric existence for generalized ALG complete non-compact Ricci flat K\"ahler manifolds with Schwartz decay i.e. metric decay in any polynomial rate to an ALG model C× Y modulo finite cyclic group action, where Y is Calabi-Yau. Consequently, for any K3 surface with a purely non-symplectic automorphism σ of finite order, a K\"ahler crepant resolution of the orbifold C × K3 σ admits ALG Ricci-flat K\"ahler metrics with Schwartz decay. It is known that K\"ahler crepant resolution exists in our case. Hence there are 39 integers, such that 2π divided by each of them is the asymptotic angle of an ALG Ricci-flat K\"ahler 3-fold with Schwartz decay. We also exhibit a 1638 parameters family of ALG Ricci-flat K\"ahler 3-folds with asymptotic angle π that realize 64 distinct triples of Betti numbers. They are iso-trivially fibred by K3 surface with a non-symplectic Nikulin involution. A simple version of local Kunneth formula for H1,1/local i∂∂-lemma plays a role in both the Schwartz decay, and the construction of ansatz that equals a Ricci flat ALG model outside a compact set (isotrivial ansatz). The proof of Schwartz decay relies on a non-concentration of the Newtonian potential, and can not be immediately generalized to fibration with higher dimensional base, due to existence of concentrating sequence of L2 normalized eigen-functions on unit round spheres of (real) dimension ≥ 2.
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