Add to ORKGWe prove that for $n\in \{4,5\}$, a closed aspherical $n$-manifold does not admit a Riemannian metric with positive scalar curvature. Additionally, we show that for $n\leq 7$, the connected sum of a $n$-torus with an arbitrary manifold does not admit a complete metric of positive scalar curvature. When combined with forthcoming contributions by Lesourd--Unger--Yau, this proves that the Schoen--Yau Liouville theorem holds for all locally conformally flat manifolds with non-negative scalar curvature. A key tool in these results are generalized soap bubbles---surfaces that are stationary for prescribed-mean-curvature functionals (also called $\mu$-bubbles).Comment: Generalized aspherical result to five dimensions, other minor update
The purposes of this thesis is to understand spaces which carry metrics of positive scalar curvature...
We study the prescribed scalar curvature problem in a conformal class on orbifolds with isolated sin...
We show that every closed, oriented, topologically PSC 4-manifold can be obtained via 0 and 1-surger...
by Ng Kwok Choi.Thesis (M.Phil.)--Chinese University of Hong Kong, 1980.Bibliography: leaves 39-43
In this paper, we study the topological rigidity and its relationship with the positivity of scalar ...
In this thesis we study different questions on scalar curvatures. The first part is devoted to obst...
This is the second and concluding part of a survey article. Whether or not a smooth manifold admits...
In this talk, I will discuss some recent developments on the topology of closed manifolds admitting ...
We exhibit new examples of manifolds which admit {\it no metrics with positive scalar curvatures} an...
In this thesis, we explore a famous theorem of Schoen and Yau stating that there exists no metric of...
Whether or not a smooth manifold admits a Riemannian metric whose scalar curvature function is stri...
We investigate questions concerning symmetries and Riemannian metrics of positive or non-negative cu...
The Theorem of Bonnet--Myers implies that manifolds with topology $M^{n-1} \times \mathbb{S}^1$ do n...
The purposes of this thesis is to understand spaces which carry metrics of positive scalar curvature...
The purposes of this thesis is to understand spaces which carry metrics of positive scalar curvature...
The purposes of this thesis is to understand spaces which carry metrics of positive scalar curvature...
We study the prescribed scalar curvature problem in a conformal class on orbifolds with isolated sin...
We show that every closed, oriented, topologically PSC 4-manifold can be obtained via 0 and 1-surger...
by Ng Kwok Choi.Thesis (M.Phil.)--Chinese University of Hong Kong, 1980.Bibliography: leaves 39-43
In this paper, we study the topological rigidity and its relationship with the positivity of scalar ...
In this thesis we study different questions on scalar curvatures. The first part is devoted to obst...
This is the second and concluding part of a survey article. Whether or not a smooth manifold admits...
In this talk, I will discuss some recent developments on the topology of closed manifolds admitting ...
We exhibit new examples of manifolds which admit {\it no metrics with positive scalar curvatures} an...
In this thesis, we explore a famous theorem of Schoen and Yau stating that there exists no metric of...
Whether or not a smooth manifold admits a Riemannian metric whose scalar curvature function is stri...
We investigate questions concerning symmetries and Riemannian metrics of positive or non-negative cu...
The Theorem of Bonnet--Myers implies that manifolds with topology $M^{n-1} \times \mathbb{S}^1$ do n...
The purposes of this thesis is to understand spaces which carry metrics of positive scalar curvature...
The purposes of this thesis is to understand spaces which carry metrics of positive scalar curvature...
The purposes of this thesis is to understand spaces which carry metrics of positive scalar curvature...
We study the prescribed scalar curvature problem in a conformal class on orbifolds with isolated sin...
We show that every closed, oriented, topologically PSC 4-manifold can be obtained via 0 and 1-surger...