On local rigidity theorems with respect to the scalar curvature
Abstract
By using the Ricci flow, we study local rigidity theorems regarding scalar curvature, isoperimetric constant and best constant of L2 logarithmic Sobolev inequality. Precisely, we prove that if a metric g on an open set V in an n-dimensional Riemannian manifold satisfies ∫V R(g) dvolg 0 \ \ and\ \ I(V) I(Rn), or ∫V R(g) dvolg 0 \ \ and\ \ S(V) S(Rn), then g=gRn on V, where R(g) is the scalar curvature of g, Rn is Euclidean space, I(V) is the isoperimetric constant of V and S(V) is best constant of L2 logarithmic Sobolev inequality of V. Moreover,we also obtain the local Rn-rigidity about local Perelman's -entropy, and local Sn-rigidity (resp. Hn-rigidity) theorems regarding the cases concerning R(g) n(n-1) (resp. R(g) -n(n-1) ), weighted isoperimetric constant and best constant of weighted L2 logarithmic Sobolev inequality for the weighted metric (dg(p,x)2)-4g (resp. (dg(p,x)2)-4g).
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