Scalar Curvature Compactness for Warped Products on S2×S1 with Varying Base Metrics

Abstract

We study the Gromov--Sormani MinA scalar curvature compactness conjecture for warped product metrics on S2×S1 of the form introduced by Kazaras-Xu in KazarasXu2023 as follows: \[ gi=φi-2hi+φi2dξ2, hi=dr2+ui2(r)dθ2. \] Assuming nonnegative scalar curvature, a uniform volume upper bound, and a positive lower bound for the areas of closed minimal surfaces, we prove a uniform diameter bound for the base surfaces (S2,hi). Based on this key estimate, we further obtain compactness of the base warping functions ui and local and global estimates for the fiber warping functions φi. After passing to a subsequence, the metrics converge in Lp, for every finite p, to a limit metric g∞. %on the regular region. We also obtain Gromov--Hausdorff and Sormani--Wenger intrinsic flat subconvergence, and prove that g∞ has nonnegative scalar curvature in the distributional sense of Lee--LeFloch. Thus the Gromov--Sormani scalar curvature compactness conjecture is verified for this warped product class. Finally, we construct a C1,α example illustrating the subtlety of volume-limit tests for nonnegative scalar curvature in low regularity.