Skip to main content

Questions tagged [geometric-analysis]

Filter by
Sorted by
Tagged with
6 votes
2 answers
390 views

Continuity of perimeter with respect to metric

Let $\Omega$ be an open set in a closed manifold, $(M^n, g)$. We can define the perimeter as $$\text{Per}_g(\Omega) = \sup\bigg\{\int_{\Omega} \text{div}_g(T) dVol_g, \; : \; T \in C^1(M, T M), \quad \...
JMK's user avatar
  • 337
0 votes
0 answers
65 views

Regularity of Metric when defining C^k norms

Given $(M^n, g)$ closed riemannian manifold, I am wondering about the definition of the $C^k$ norms with respect to the metric, and how these norms depend on $g$. For example, I would assume that if $...
JMK's user avatar
  • 337
2 votes
0 answers
73 views

Diameter bounds by mean curvature and area

I'm wondering about a generalization of Simon/Topping/Wu-Zheng's results on bounding diameter by the mean curvature, which roughly says: given a closed $\Sigma^{n-1} \subseteq M^n$, $$\text{diam}(\...
JMK's user avatar
  • 337
14 votes
1 answer
573 views

Different proof techniques of the Atiyah-Singer index theorem

I am aware of the usual K-theoretical (cobordism, operator algebras) and heat kernel proofs of the index theorem, as answered in other questions in this site, e.g. here. However, I recently read this ...
Álvaro Sánchez Hernández's user avatar
0 votes
0 answers
40 views

Is the principal eigenvalue of the clamped plate minimized by the equilateral triangle among all triangles of a given area?

Let $\Omega$ be a ``nice'' domain in $\mathbb{R}^2$ (bounded and with piecewise smooth boundary). Consider the clamped plate eigenvalue problem, given by $$\Delta^2 u = \lambda u $$ $$ u|_{\partial \...
Ritwik's user avatar
  • 3,245
3 votes
0 answers
68 views

How powerful are sequences of Steiner symmetrizations?

I was studying geometric analysis and have encountered something called Steiner symmetrization method. Intuitively I understand how it's made to be applied and used, but Wikipedia pages do not give ...
cnikbesku's user avatar
  • 171
1 vote
0 answers
56 views

Good orbifold and Ricci flow with Dirichlet boundary conditions on $\Sigma$

An orbifold $\mathcal O$ is a metrizable topological space equipped with an atlas modeled on $\Bbb R^n/\Gamma, \Gamma<O(n)$ finite. Let $\Sigma$ be the singular locus i.e. points modeled on $\...
John McManus's user avatar
5 votes
0 answers
338 views

Milnor’s smoothed corners technique for a product of manifolds with boundary and boundary defining functions

Let $M$ be a smooth manifold that we view as the interior of a compact manifold with boundary $\overline{M}$. Let $\rho$ be a boundary defining function for $\overline{M}$, i.e. $\rho$ is smooth, $\...
zarathustra's user avatar
3 votes
1 answer
286 views

A compact Riemann surface with a finite set of points removed is parabolic

A Riemann surface $\mathcal{R}$ is called parabolic if it is not compact and doesn't carry a negative non-constant subharmonic function, and is called hyperbolic if it carries a negative non-constant ...
gaoqiang's user avatar
  • 438
3 votes
0 answers
159 views

Conformal Killing vector fields on manifolds that are not asymptotically flat

Let $M = [1,\infty) \times S^2$. Equip $M$ with the metric $g = dr^2 + r^2 (\gamma + h)$ where $\gamma$ is a metric on $S^2$ and $h$ is a $(0,2)$ tensor on $M$ that satisfies $$h = O(1/r),\quad \...
Laithy's user avatar
  • 969
3 votes
1 answer
152 views

Derive distributional inequalities from pointwise estimates

My question is how to prove the following claim: Suppose that $E$ is an algebraic set in $\mathbb{R}^n (n\ge3)$ with dimension $\le n-2$, and $u$ is locally Lipschitz continuous on $\mathbb{R}^n$. If ...
William's user avatar
  • 33
4 votes
1 answer
181 views

Is every area-minimizing cone a level set of a least-gradient function?

Let $\mathbf{C}^n \subset \mathbf{R}^{n+1}$ be a minimizing cone with an isolated singularity. One example, in a space of even dimension, i.e. if $\mathbf{R}^{n+1} = \mathbf{R}^{2m}$, is the Simons ...
Leo Moos's user avatar
  • 5,048
3 votes
0 answers
100 views

Asymmetric minimal surfaces in $H^3$

Inspired by this question, are there any explicit parameterizations of asymmetric minimal surfaces in $\mathbb{H}^3$? E.g. something like the minimal surface which lies over the ellipse given by $$y^2 ...
JMK's user avatar
  • 337
5 votes
0 answers
104 views

Is it always possible to find a conjugate optical function?

Optical functions (functions with null gradients) and double null foliations (foliations of a spacetime by two related optical functions) play a large roll in modern mathematical relativity research. ...
Chris's user avatar
  • 419
1 vote
0 answers
67 views

Limits of branched minimal immersions into the sphere

Can a sequence of branched minimal immersions $M_j^n$ in the round sphere $S^{n+1}$ converge to a smoothly embedded $\Sigma$, in the sense that $ M_j \to 2 \Sigma$ as currents or varifolds? The case ...
Leo Moos's user avatar
  • 5,048
2 votes
1 answer
148 views

Minimal graph with confusing (?) property

Let $n \geq 2$ and $C = \{ (x,y) \in \mathbf{R}^{2n} \mid \lvert x \rvert = \lvert y \rvert \} \subset \mathbf{R}^{2n}$ be the Simons cone. (Whether this is area-minimizing or not does not seem to ...
Leo Moos's user avatar
  • 5,048
5 votes
1 answer
310 views

Lee-Parker Yamabe problem proposition 4.6

I believe there may be a gap towards the end of the proof of proposition 4.6 in the Bulletin of the AMS paper The Yamabe Problem by Lee and Parker : https://projecteuclid.org/journals/bulletin-of-the-...
Marc's user avatar
  • 457
2 votes
0 answers
207 views

Tangent cones at infinity and the regularity of minimal submanifolds

In the famous paper by D. Fischer-Colbrie "Some rigidity theorems for minimal submanifolds of the sphere", the very first sentence reads: It is well known that the regularity of minimal ...
Cris.giansu's user avatar
2 votes
0 answers
80 views

$ \varepsilon $-regularity, harmonic maps vs harmonic heat flow

Let $ \Omega\subset\mathbb{R}^n $ be a bounded domain with smooth boundary and $ (N,h)\subset\mathbb{R}^L $ is a smooth compact Riemannian manifold. Consider the local minimizer $ u\in W^{1,2}(\Omega,...
Luis Yanka Annalisc's user avatar
2 votes
0 answers
122 views

Local smoothness of harmonic heat flow

Assume that $ (M,g) $ is a smooth closed manifold and $ \mathbb{S}^{L-1} $ is a unit sphere with dimension $ L-1 $ in $ \mathbb{R}^{L} $. Consider the equation of harmonic heat flow $$ \partial_tu-\...
Luis Yanka Annalisc's user avatar
1 vote
1 answer
123 views

Singularities of mean-convex MCF in the sphere?

Let $\Sigma^n \subset S^{n+1}$ be a codimension one, embedded minimal hypersurface in the sphere. As the sphere has positive Ricci curvature, this must be unstable. In particular, perturbing $\Sigma$ ...
Leo Moos's user avatar
  • 5,048
2 votes
1 answer
151 views

A question related to Ros's two-piece property

In 1995 Ros proved that minimal surfaces in the round three-sphere $S^3$ enjoy a two-piece property: any hyperplane $\Pi \subset \mathbf{R}^4$ divides every minimal surface $\Sigma \subset S^3$ into ...
Leo Moos's user avatar
  • 5,048
4 votes
0 answers
153 views

Is there a good description of harmonic maps from $\mathbf{C}$ to $\mathbf{H}$?

Given a non-constant holomorphic quadratic differential $\phi \, \mathrm{d} z^2$ on the complex plane $\mathbf{C}$, there is a harmonic diffeomorphism $u: \mathbf{C} \to \mathbf{H}$ into the ...
Leo Moos's user avatar
  • 5,048
1 vote
0 answers
61 views

Existence of solution to prescribed curvature problem with given asymptotic on the punctured unit disc

I have trouble understanding a conclusion in the following paper: Prescribed Curvature and Singularities of Conformal Metrics on Riemann Surfaces by Robert C. McOwen In the appendix, part B, we are ...
Sven-Ole Behrend's user avatar
5 votes
1 answer
147 views

What is the Morse index of the Scherk surfaces?

The Scherk surfaces are properly embedded, complete minimal surfaces \begin{equation} S_\alpha \subset \mathbf{R}^3 \end{equation} that are asymptotic at infinity to the union of two planes $\Pi_1, \...
Leo Moos's user avatar
  • 5,048
2 votes
0 answers
71 views

Examples of elementary group of isometries of the ideal boundary of hyperbolic plane

A Riemannian manifold $(X,g)$ is called Hadamard manifold if it is complete and simply connected and has everywhere non-positive sectional curvature. An example of such a manifold would be the ...
Quanta's user avatar
  • 41
2 votes
0 answers
134 views

Critical points of a strictly subharmonic function

Let $M$ be a smooth, compact manifold with boundary. Let $u: M \to \mathbf{R}$ be a smooth function that has its Riemannian Laplacian equal to a positive constant: \begin{equation} \Delta u = A > 0....
Leo Moos's user avatar
  • 5,048
2 votes
0 answers
134 views

What prevents spontaneous oscillations in minimal surfaces?

Let $\mathbf{C}^n \subset \mathbf{R}^{n+1}$ be an unstable minimal cone with an isolated singularity at the origin. Let $\Sigma \subset \partial B$ be its link, and $(\varphi_i)$ be the eigenfunctions ...
Leo Moos's user avatar
  • 5,048
7 votes
1 answer
511 views

Existence and estimates of Green's function on Riemannian manifold

In Yau and Schoen's differential geometry,in Ch5 before Thm 3.5,the author says When $R$(scalar curvature of a manifold M)$>0$,there exists a unique Green's function $G$ to the operator $L=-\Delta+...
Tree23's user avatar
  • 217
2 votes
0 answers
65 views

Defining minimality 'through deformations'

Let $U \subset \mathbf{R}^{n+k}$ be a bounded open set, and $T \in \mathbf{I}_n(U)$ be an $n$-dimensional integral rectifiable current. Say that $T$ is stationary through (homological) deformations if ...
Leo Moos's user avatar
  • 5,048
1 vote
0 answers
40 views

Singular asymptotic limits of mean-convex MCF

Let $(M_t \mid t \geq 0)$ be a mean-convex mean curvature flow of hypersurfaces in ambient Riemannian manifold $(N^{n+1},g)$. Brian White proved that this flow (defined 'weakly' as a level set flow ...
Leo Moos's user avatar
  • 5,048
8 votes
0 answers
370 views

Existence of Yang-Mills connection

My question is about what we know, in dimension $4$, about the loss of compactness of Yang–Mills connections with $L^2$-bounded curvature. My background is more analytical than geometrical and it is ...
Paul's user avatar
  • 914
2 votes
0 answers
79 views

Curvature estimate in terms of the boundary

The curvature of a minimal disc $S^2 \subset \mathbf{R}^3$ can be bounded in terms of the curvature of its boundary via the Gauss–Bonnet formula: \begin{equation} \frac{1}{2}\int_S \lvert A \rvert^2 \...
Leo Moos's user avatar
  • 5,048
1 vote
0 answers
59 views

Dirichlet-to-Neumann estimate for minimal graphs

Let $\Omega \subset \mathbf{R}^n$ be a smooth, bounded domain. The Dirichlet problem for the minimal surface equation \begin{equation} (1 + \lvert Du \rvert^2) \Delta u - D_i u D_j u D_{ij} u = 0 \end{...
Leo Moos's user avatar
  • 5,048
4 votes
1 answer
181 views

One-sided version of the curve-shortening flow

The curve-shortening flow is $$ \frac{\partial C}{\partial t} = \kappa n $$ where $\kappa$ is the curvature, and $n$ is the unit normal vector. For a smooth Jordan curve $C\subset\mathbb R^2$ (closed ...
André Henriques's user avatar
2 votes
1 answer
98 views

The attractive 'force' between phase interfaces in the Allen-Cahn model

The heuristic explanation of the behavior of phase transition in the Allen–Cahn model describes two 'forces' at play: the curvature of the phase interfaces—they each 'want to' minimize length; and an ...
Leo Moos's user avatar
  • 5,048
3 votes
0 answers
101 views

Are there Lojasiewicz-Simon estimates with boundary?

Let $M$ be an analytic manifold with boundary $\partial M$, equipped with a Riemannian metric $g$, which is also analytic up to and including the boundary. Are there Lojasiewicz–Simon estimates ...
Leo Moos's user avatar
  • 5,048
2 votes
1 answer
276 views

The space of Sobolev maps between Riemannian manifolds

Let $\mathcal{M}, \mathcal{N}$ be two Riemannian manifods. Suppose that $\mathcal{N}$ is properly and isometrically embedded in $\mathbb{R}^n$. The space of Sobolev maps between $\mathcal{M}$ and $\...
gaoqiang's user avatar
  • 438
7 votes
2 answers
368 views

What's the limit of a sequence of harmonic maps between manifolds?

Let ${M}, \, {N}$ be two Riemannian manifolds, and let $u_n: {M} \to {N}$ be a sequence of harmonic maps. Question. Suppose that $u_n$ converges uniformly to a (necessarily continuous) function $u$. ...
gaoqiang's user avatar
  • 438
4 votes
0 answers
193 views

What are the next-simplest area-minimizing cones?

The simplest area-minimizing, codimension one cones $\mathbf{C} \subset \mathbf{R}^{n+1}$ are the Simons cones. I am trying to understand the behavior of area-minimizing cones a bit better, but these ...
Leo Moos's user avatar
  • 5,048
4 votes
1 answer
346 views

Is there a harmonic function with just one singular point?

Let $D \subset \mathbf{R}^2$ be the unit disc, and $L > 0$. Let $u: D \times (-L,L) \to \mathbf{R}$ satisfy \begin{equation} \begin{cases} \Delta u = 0 \quad \text{ on $D \times (-L,L)$ } \\ \frac{...
Leo Moos's user avatar
  • 5,048
2 votes
0 answers
175 views

When are the Schoen-Yau minimal surfaces embedded?

In 1979, Rick Schoen and Shing-Tung Yau published an Annals paper in which they proved the existence of so-called 'incompressible' minimal surfaces in compact Riemannian manifolds. Question. Under ...
Leo Moos's user avatar
  • 5,048
2 votes
1 answer
181 views

Parabolic Schwarz lemma

Trying to follow the computation in Song and Tian - The Kähler–Ricci flow on surfaces of positive Kodaira dimension, page 7, theorem 3.1 which proved a parabolic Schwarz lemma. Specifically, they ...
Shiyu's user avatar
  • 59
2 votes
0 answers
153 views

An equality regarding Dirac operator

Let S be a spinor bundle on a closed Riemannian manifold M, with a spin connection A. Then for a spinor field $\phi$, we know \begin{align*} \frac{1}{2}\Delta|\phi|^2=\langle \nabla_A^*\nabla_A \phi,\...
Partha's user avatar
  • 954
2 votes
0 answers
665 views

Reference request - Texts on geometric analysis with exercises

I’ve recently been studying some Riemannian geometry and geometric analysis, however I have found it difficult to find resources with exercises to practice. It seems that many textbooks past the ...
3 votes
0 answers
172 views

A pde inequality

Say $M$ be a closed manifold of dimension $6$, we have \begin{align*} \Delta f\leq g f-f^2 \end{align*} where $g$ is a smooth function on $M$ and $f\geq 0$ (in my case $f=|\phi|^2$ for $\phi$ a ...
Partha's user avatar
  • 954
5 votes
0 answers
160 views

Potential theory as a tool in extrinsic flows

Let $M \subseteq \mathbb{R}^n$ be a submanifold. For a point $x$ disjoint from $M$, we can define the electric potential $\Phi(x) = \int_M \frac{dM}{|x-m|^{n-2}}$, which is smooth and harmonic where ...
maxematician's user avatar
2 votes
1 answer
68 views

Question of an inequality from curve-shortening flow

I am reading a paper about the curve shortening flow which make use of one inequality but I don't know where does it come from where f(x,t) is a smooth function and C is a constant depending on time t....
James Chiu's user avatar
4 votes
0 answers
114 views

How can I numerically solve the Laplace equation with cohomological data?

Consider the problem of solving for $u$ where $-\Delta u = f$, $[u] = [g]$ where $[\cdot]$ denotes cohomology class and $u, f, g$ are $p$-forms on a Riemannian manifold $M$. If $g$ instead was ...
Aidan Backus's user avatar
6 votes
1 answer
296 views

Solving $\Delta \text{tr}(h) - \mathrm{div}(\mathrm{div}(h)) + \text{tr}(h) = f$ on $S^2$

$\DeclareMathOperator\ddiv{div}\DeclareMathOperator\tr{tr}\newcommand{\conf}{\mathrm{conf}}$Consider this PDE on a symmetric tensor $h$ on $S^2$: $$\Delta \text{tr}(h) - \ddiv(\ddiv(h)) + \tr(h) = f$$ ...
Laithy's user avatar
  • 969