Sharp gradient estimate, rigidity and almost rigidity of Green functions on non-parabolic RCD(0,N) spaces

Abstract

Inspired by a result of Colding, the present paper studies the Green function G on a non-parabolic RCD(0,N) space (X, d, m) for some finite N>2. Defining bx=G(x, ·)12-N for a point x ∈ X, which plays a role of a smoothed distance function from x, we prove that the gradient |∇ bx| has the canonical pointwise representative with the sharp upper bound in terms of the N-volume density x=r 0+m (Br(x))rN of m at x; equation* |∇ bx|(y) (N(N-2)x)1N-2, for any y ∈ X \x\. equation* Moreover the rigidity is obtained, namely, the upper bound is attained at a point y ∈ X \x\ if and only if the space is isomorphic to the N-metric measure cone over an RCD(N-2, N-1) space. In the case when x is an N-regular point, the rigidity states an isomorphism to the N-dimensional Euclidean space RN, thus, this extends the result of Colding to RCD(0,N) spaces. It is emphasized that the almost rigidities are also proved, which are new even in the smooth framework.