Infinite-time blowing-up solutions to small perturbations of the Yamabe flow

Abstract

Under the validity of the positive mass theorem, the Yamabe flow on a smooth compact Riemannian manifold of dimension N 3 is known to exist for all time t and converges to a solution to the Yamabe problem as t ∞. We prove that if a suitable perturbation, which may be smooth and arbitrarily small, is imposed on the Yamabe flow on any given Riemannian manifold M of dimension N 5, the resulting flow may blow up at multiple points on M in the infinite time. Our proof is constructive, and indeed we construct such a flow by using solutions of the Yamabe problem on the unit sphere SN as blow-up profiles. We also examine the stability of the blow-up phenomena under a negativity condition on the Ricci curvature at blow-up points.

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