Metric transformations under collapsing of Riemannian manifolds

Abstract

Let (M,g) be a Riemannian manifold with an isometric action of the Lie group G. Let gG be a left invariant metric on G. Consider the diagonal G action on the product M × G with the metric g+gG. In this paper we calculate the formula for the metric h on the quotient space (M × G) / G; the map from g to h is the metric transformation. In particular when g is the hyperbolic metric on H2 and G=S1, the transformed metric h is Hamilton's cigar soliton metric studied in the Ricci flow.

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