Yamabe flow on non-compact manifolds with unbounded initial curvature
Abstract
We prove global existence of Yamabe flows on non-compact manifolds M of dimension m≥3 under the assumption that the initial metric g0=u0gM is conformally equivalent to a complete background metric gM of bounded, non-positive scalar curvature and positive Yamabe invariant with conformal factor u0 bounded from above and below. We do not require initial curvature bounds. In particular, the scalar curvature of (M,g0) can be unbounded from above and below without growth condition.
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