The power series expansions of logarithmic Sobolev, W- functionals and scalar curvature rigidity

Abstract

In this paper, we obtain that the logarithmic Sobolev and W-functionals admit remarkable power series expansions when appropriate test functions are selected. Using these expansions formulas, we prove that for an open subset V in an n-dimensional manifold M with V⊂ M satisfying: (a)The scalar curvature of V satisfies the lower bound:Sc(x) ≥ n(n-1)K for all x ∈ V, (b) The isoperimetric profile of V is no less than that of space form MnK: I(V,β) := ∈f⊂ V \\ Vol()=β Area(∂ ) ≥ I(MnK,β) for some β0>0 and all 0<β<β0,then the sectional curvature of V must satisfy Sec(x) = K for all x ∈ V. Additionally, we derive some new scalar curvature rigidity theorems concerninglogarithmic Sobolev inequality and Perelman's μ-functional.