Cohomogeneity One Expanding Ricci Solitons and the Expander Degree
Abstract
We consider the space of smooth gradient expanding Ricci soliton structures on S1 × R3 and S2 × R2 which are invariant under the action of SO(3) × SO(2). In the case of each topology, there exists a 2-parameter family of cohomogeneity one solitons asymptotic to cones over the link S2 × S1, as constructed by Nienhaus-Wink and Buzano-Dancer-Gallaugher-Wang. By analyzing the resultant soliton ODEs, we reconstruct the 2-parameter families in each case and provide an alternate proof of conicality. Analogous to work of Bamler and Chen, we define a notion of expander degree for these cohomogeneity one solitons through a properness result. We then proceed to calculate this cohomogeneity one expander degree in the cases of the specific topologies.
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