A family of steady Ricci solitons and Ricci-flat metrics

We produce new non-Kähler complete steady gradient Ricci solitons whose asymptotics combine those of the Bryant solitons and the Hamilton cigar. The underlying manifolds are of the form $\mathbb{R}^2 \times M_2 \times \cdots \times M_r$ where $M_i$ are arbitrary Einstein manifolds with positive scalar curvature. On the same spaces we also obtain a family of complete non-Kähler Ricci-flat metrics with asymptotically locally conical asymptotics. Among these new Ricci-flat and soliton examples are pairs with dimension $4m + 3$ which are homeomorphic but not diffeomorphic.

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Published 30 January 2015