Add to ORKGWe consider the mean curvature rigidity problem of an equatorial zone on a sphere which is symmetric about the equator with width $2w$. There are two different notions on rigidity, i.e. strong rigidity and local rigidity. We prove that for each kind of these rigidity problems, there exists a critical value such that the rigidity holds true if, and only if, the zone width is smaller than that value. For the rigidity part, we used the tangency principle and a specific lemma (the trap-slice lemma we established before). For the non-rigidity part, we construct the nontrivial perturbations by a gluing procedure called the round-corner lemma using the Delaunay surfaces.Comment: 29 pages, 11 figures. Comments welcom
We prove a rigidity result in the sphere which allows us to generalize a result about smooth convex ...
We consider surfaces with boundary satisfying a sixth-order nonlinear elliptic partial differential ...
Abstract. We prove a rigidity result in the sphere which allows us to generalize a result about smoo...
<p>In this dissertation we study scalar curvature rigidity phenomena for the upper hemisphere, and s...
By using Gromov's $\mu$-bubble technique, we show that the $3$-dimensional spherical caps are rigid ...
Abstract. We prove rigidity for hypersurfaces in the unit (n + 1)-sphere whose scalar curvature is b...
The open problem related to my talk is to prove or disprove the following Conjecture 0.1 (MinOo). Le...
We prove that horospheres, hyperspheres and hyperplanes in a hyperbolic space H n , n ≥ 3, admit no ...
This thesis proves rigidity theorems for three-dimensional Riemannian manifolds with scalar curvatur...
It is proved by Brendle in [4] that the equatorial disk $D^k$ has least area among $k$-dimensional f...
A subcomplex $X\leq \mathcal{C}$ of a simplicial complex is strongly rigid if every locally injectiv...
In this paper, we prove a rigidity theorem for smooth strictly convex domains in Euclidean spaces.Co...
International audienceMotivated by optimal control of affine systems stemming from mechanics, metric...
For any open hyperbolic Riemann surface $X$, the Bergman kernel $K$, the logarithmic capacity $c_{\b...
This survey describes some recent rigidity results obtained by the authors for the prescribed mean c...
We prove a rigidity result in the sphere which allows us to generalize a result about smooth convex ...
We consider surfaces with boundary satisfying a sixth-order nonlinear elliptic partial differential ...
Abstract. We prove a rigidity result in the sphere which allows us to generalize a result about smoo...
<p>In this dissertation we study scalar curvature rigidity phenomena for the upper hemisphere, and s...
By using Gromov's $\mu$-bubble technique, we show that the $3$-dimensional spherical caps are rigid ...
Abstract. We prove rigidity for hypersurfaces in the unit (n + 1)-sphere whose scalar curvature is b...
The open problem related to my talk is to prove or disprove the following Conjecture 0.1 (MinOo). Le...
We prove that horospheres, hyperspheres and hyperplanes in a hyperbolic space H n , n ≥ 3, admit no ...
This thesis proves rigidity theorems for three-dimensional Riemannian manifolds with scalar curvatur...
It is proved by Brendle in [4] that the equatorial disk $D^k$ has least area among $k$-dimensional f...
A subcomplex $X\leq \mathcal{C}$ of a simplicial complex is strongly rigid if every locally injectiv...
In this paper, we prove a rigidity theorem for smooth strictly convex domains in Euclidean spaces.Co...
International audienceMotivated by optimal control of affine systems stemming from mechanics, metric...
For any open hyperbolic Riemann surface $X$, the Bergman kernel $K$, the logarithmic capacity $c_{\b...
This survey describes some recent rigidity results obtained by the authors for the prescribed mean c...
We prove a rigidity result in the sphere which allows us to generalize a result about smooth convex ...
We consider surfaces with boundary satisfying a sixth-order nonlinear elliptic partial differential ...
Abstract. We prove a rigidity result in the sphere which allows us to generalize a result about smoo...