Nonexistence of NNSC-cobordism of Bartnik data

Abstract

In this paper, we consider the problem of nonnegative scalar curvature (NNSC) cobordism of Bartnik data (1n-1, γ1, H1) and (2n-1, γ2, H2). We prove that given two metrics γ1 and γ2 on Sn-1 (3 n 7) with H1 fixed, then (Sn-1, γ1, H1) and (Sn-1, γ2, H2) admit no NNSC cobordism provided the prescribed mean curvature H2 is large enough(Theorem highdimnoncob0). Moreover, we show that for n=3, a much weaker condition that the total mean curvature ∫S2H2dμγ2 is large enough rules out NNSC cobordisms(Theorem 2-d0); if we require the Gaussian curvature of γ2 to be positive, we get a criterion for non existence of trivial NNSC-cobordism by using Hawking mass and Brown-York mass(Theorem cobordism20). For the general topology case, we prove that (1n-1, γ1, 0) and (2n-1, γ2, H2) admit no NNSC cobordism provided the prescribed mean curvature H2 is large enough(Theorem highdimnoncob10).