Warped products over one-dimensional base spaces and the RCD condition

Abstract

We prove the Riemannian curvature-dimension condition RCD(KN,N+1) for an N-warped product B×fN F over a one-dimensional base space B with a Lipschitz function f: B→ R≥ 0, provided (1) f is a Kf-concave function, (2) f satisfies a sub-Neumann boundary condition ∂ f∂ n≥ 0 on ∂ B f-1(0) and F is a compact metric measure space satisfying (3) the condition RCD(KF (N-1), N) with KF:= B \ (Df)2 + Kf2\. The result is sharp, i.e. we show that (1), (2) and (3) are necessary for the validity of statement provided KF≥ 0. In general, only a weaker statement is true. If f is assumed to be Kf-affine, then the condition RCD(K N, N+1) for the N-warped product holds if and only if the condition RCD(KF(N-1), N) holds for F for any KF∈ R.