Positive mass theorems of ALF and ALG manifolds (2103.11289v2)
Abstract: In this paper, we want to prove positive mass theorems for ALF and ALG manifolds with model spaces $\mathbb R{n-1}\times \mathbb S1$ and $\mathbb R{n-2}\times \mathbb T2$ respectively in dimensions no greater than $7$ (Theorem \ref{ALFPMT0}). { Different from the compatibility condition for spin structure in \cite[Theorem 2]{minerbe2008a}, we show that some type of incompressible condition for $\mathbb S1$ and $\mathbb T2$ is enough to guarantee the nonnegativity of the mass.} As in the asymptotically flat case, we reduce the desired positive mass theorems to those ones concerning non-existence of positive scalar curvature metrics on closed manifolds coming from generalize surgery to $n$-torus. { Finally, we investigate certain fill-in problems and obtain an optimal bound for total mean curvature of admissible fill-ins for flat product $2$-torus $\mathbb S1(l_1)\times \mathbb S1(l_2)$.}
Paper Prompts
Sign up for free to create and run prompts on this paper using GPT-5.
Top Community Prompts
Collections
Sign up for free to add this paper to one or more collections.