Conformally related Riemannian metrics with non-generic holonomy

Abstract

We show that if a compact connected n-dimensional manifold M has a conformal class containing two non-homothetic metrics g and g=e2g with non-generic holonomy, then after passing to a finite covering, either n=4 and (M,g, g) is an ambik\"ahler manifold, or n 6 is even and (M,g, g) is obtained by the Calabi Ansatz from a polarized Hodge manifold of dimension n-2, or both g and g have reducible holonomy, M is locally diffeomorphic to a product M1× M2× M3, the metrics g and g can be written as g=g1+g2+e-2g3 and g=e2(g1+g2)+g3 for some Riemannian metrics gi on Mi, and is the pull-back of a non-constant function on M2.