Convergence of Ricci flow on R2 to flat space
Abstract
We prove that, starting at an initial metric g(0)=e2u0(dx2+dy2) on R2 with bounded scalar curvature and bounded u0, the Ricci flow ∂t g(t)=-Rg(t)g(t) converges to a flat metric on R2.
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We prove that, starting at an initial metric g(0)=e2u0(dx2+dy2) on R2 with bounded scalar curvature and bounded u0, the Ricci flow ∂t g(t)=-Rg(t)g(t) converges to a flat metric on R2.