RICCI FLOW ON SURFACES WITH DEGENERATE INITIAL METRICS
RICCI FLOW ON SURFACES WITH DEGENERATE INITIAL METRICS
摘要
It is proved that given a conformal metric e^uog0, with e^uo ∈ L∞, on a 2-dim closed Riemannian manfold (M, go), there exists a unique smooth solution u(t) of the Ricci flow such that u(t)→ U0 in L^2 as t→0.
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