New exotic examples of Ricci limit spaces

Abstract

For any integers m≥slant n≥slant 3, we construct a Ricci limit space Xm,n such that for a fixed point, some tangent cones are Rm and some are Rn. This is an improvement of Menguy's example. Moreover, we show that for any finite collection of closed Riemannian manifolds (Mini,gi) with Ricgi≥slant(ni-1)≥slant 1, there exists a collapsed Ricci limit space (X,d,x) such that each Riemannian cone C(Mi,gi) is a tangent cone of X at x.

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