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2 votes
0 answers
115 views

Does this Sobolev-space like construction have a name?

Take $\Omega \subset \mathbb{R}^n$ arbitrary then define as $X$ the closure of $C^1(\Omega) \cap W^{1,1}(\Omega)$ w.r.t. the norm $f \mapsto \left\lVert f \right\rVert_{\infty} + \left\lVert \nabla f \...
Kinzlin's user avatar
  • 305
1 vote
1 answer
518 views

Interpolation between Schatten classes

I was wondering if there is an analogue to the classical Riesz Thorin theorem for Schatten classes. I suppose the answer is yes, since Schatten classes are so similar to $\ell^p$ spaces for which the ...
Kinzlin's user avatar
  • 305
6 votes
3 answers
1k views

Orthonormal basis in $W^{1,2}([0,1])$

Consider the Hilbertspace $W^{1,2}([0,1])$ (i.e. Sobolev space) with the standard inner product which is defined by: $(f,g) = (f,g)_{L^{2}([0,1])} + (f',g')_{L^{2}([0,1])}$. Here $[0,1]$ is not ...
Pablo's user avatar
  • 63
2 votes
1 answer
290 views

Any viscosity solution must be the distance function?

Suppose $U \subseteq \mathbb{R}^d$ is open and bounded. Is it possible anybody could supply a simple proof that any viscosity solution of$$\begin{cases} |Du| = 1 & \text{in }U \\ u = 0 & \text{...
Jakob W's user avatar
  • 349
1 vote
0 answers
63 views

Direct proof of fact $u \in C(U)$ satisfies $|Du| \ge 1$ in sense of viscosity if and only if property holds

Is it possible anybody could sketch me a direct proof of the fact that $u \in C(U)$ satisfies $|Du| \ge 1$ in the sense of viscosity if and only if the following property holds? If $V \subseteq U$ is ...
Jakob W's user avatar
  • 349
3 votes
1 answer
239 views

Distance function is unique nonnegative continuous function on $\mathbb{R}^d$ satisfying following

Suppose $U \subsetneq \mathbb{R}^d$ is open. How do I see that the distance function$$u(x) = \min_{y \in \mathbb{R}^d \setminus U} |x - y|$$is the unique nonnegative continuous function on $\mathbb{R}^...
Jakob W's user avatar
  • 349
1 vote
0 answers
105 views

Positivity of solution of Poisson equation

Let $B$ denote the unit ball centered at the origin in $R^N$ and take $N \ge 3$. Let $( \phi_k(\theta), \lambda_k)$ for $ k \ge 0$ denote the Eigenpairs of $ -\Delta_\theta$ on $S^{N-1}$ which are $L^...
Math604's user avatar
  • 1,385
1 vote
0 answers
105 views

compactness of sequence of harmonic functions

Let $ \Omega$ denote a smooth bounded domain in $ R^N$ and let $u_m \in C^\infty( \overline{\Omega})$ harmonic functions. We also suppose $ u_m$ is bounded in $L^2(\Omega)$ (uniformly in $m$). ...
Math604's user avatar
  • 1,385
1 vote
0 answers
331 views

Verifying a claim regarding $H^1$ weak convergence and $L^2$ strong convergence on a surface

I'm reading a paper whose first section discussed $H^1$ maps defined on star-shaped sets, but I got stuck in verifying a claim for quite a while. I'm now thinking the claim is wrong, but it's hard to ...
student's user avatar
  • 1,350
1 vote
0 answers
99 views

Existence of a viscosity solution

Setup I'm trying to find sufficient conditions for the existence of a viscosity solution to the following PDE, $$ f(t,s,z) + \partial_sf(t,s,z) \\ + \sum_{i=1}^{\infty} \left[ \partial_{z_i} f(t,s,z)...
ABIM's user avatar
  • 5,405
0 votes
1 answer
95 views

Estimating pointwise multiplication conjugated by a Fourier multiplier

I asked this question first on MSE but there was no activity. Let $m(D)$ be a Fourier multiplier and $f$ a known function. I'm trying to estimate the operator $$Tu=m^{-1}(D)(f(x)m(D)u)$$ in say $H^s$....
Funktorality's user avatar
1 vote
0 answers
128 views

determine when $e^{ikx}$ can be boundary value of a holomorphic function

Assume that $\Gamma=\{x+if(x): x\in \mathbb{R}\}$ is a graph, separating $\mathbb{C}$ into two connected components. Let's denote the one below $\Gamma$ by $\Omega$. My question is, for what curves $...
user54646's user avatar
8 votes
2 answers
634 views

Existence of a uniformly continuous function $g$ on $\mathbb{R}$ where $f = g$ a.e.?

Suppose $f \in L^\infty(\mathbb{R})$, $f_h(x) = f(x + h)$, and$$\lim_{h \to 0} \|f_h - f\|_\infty = 0.$$Does there exist a uniformly continuous function $g$ on $\mathbb{R}$ such that $f = g$ almost ...
user100749's user avatar
1 vote
0 answers
53 views

Given a fixed convex domain $\Omega$ in 3D, for what value $c$ the function $f(c) := \int_{\partial \Omega} |x-c| d \sigma_x$ gets its minimum?

Let $\Omega$ be a bounded smooth convex domain in $\mathbb{R}^3$, then consider the following minimization problem: $$\inf_{c \in \overline{\Omega}} f(c), \quad f(c) := \int_{\partial \Omega} |x-c| ...
student's user avatar
  • 1,350
3 votes
1 answer
531 views

An argument in the proof of a compactness theorem

In the proof of a compactness theorem involving fractional derivatives in Temam's Navier-Stokes Equations, an argument as the following is made. Suppose $X_0,X,X_1$ are Hilbert spaces such that ...
user avatar
2 votes
1 answer
116 views

Bounding a function with second moments

Let $f(x,y)$ be a non-negative function with $x,y \in \mathbb R^3$ that satisfies $$ I_1(f) := \iint_{\mathbb R^3 \times \mathbb R^3 } f(x,y) \, dx \ dy < \infty $$ and $$ I_2(f) := \iint_{\...
cupcake's user avatar
  • 183
3 votes
0 answers
588 views

Time-dependent Sobolev spaces

Given the Sobolev space $H^1((a,b);H^2(\mathbb{R}))$ and a function $g$ in that space. Consider now another function $f \in C_c^{\infty}((a,b) \times \mathbb{R}).$ Then for almost any $t \in (a,b)$ we ...
Rabio's user avatar
  • 31
3 votes
3 answers
219 views

Asymptotic behavior of an integral transform

Given $g\in L^2(\mathbb{R}^3)$, consider the following function ( defined for $r>0$ ): $$c(r):=\int_{\mathbb{R}^3}\frac{g(x)}{|x|^2+r}dx$$ I'm interested in the behavior of $c(r)$ for large $r$. A ...
Capublanca's user avatar
3 votes
1 answer
187 views

Free quantum evolution operator on Sobolev space

I am not a mathematician, but would like really like to get some confirmation on the things I am doing here. Let $-\Delta: H^2(\mathbb{R}) \subset L^2(\mathbb{R}) \rightarrow L^2(\mathbb{R})$ then ...
plain's user avatar
  • 95
7 votes
0 answers
394 views

Fixed radius mean value property implies harmonicity?

Let $f$ be a continuous real-valued function on $\mathbb{R}^n$. It is well known that the following are equivalent: $f$ is harmonic. $f$ satisfies the ball mean value property $$ f(x)=\frac{1}{|B(x,r)...
Snoop Catt's user avatar
3 votes
1 answer
146 views

Radial Kernel with Bounded Support and Norm of Gradient Bounded by a Dimension-free Constant

I was wondering if it is possible to construct a compactly supported radial kernel function in $\mathbb{R}^d$ such that the norm of the gradient is bounded by some dimension-free constant. That is, ...
Steve's user avatar
  • 1,127
3 votes
1 answer
670 views

A specific mollified functions in the Sobolev space H^1(R)

Let $u>0$ be in $H^{1}(\mathbb{R})=W^{1,2}(\mathbb{R})$, we know that the set of $C^{\infty}$ functions with compact support are dense in the Sobolev space $H^{1}(\mathbb{R})$. Hence, we have a ...
papnass's user avatar
  • 31
0 votes
1 answer
160 views

Global Poincaré type estimate

For simplicity let us assume we are considering $\mathbb{R}^3$. Let us define the weighted Sobolev norm $\| u \|^2_{L^2_{\alpha}}= \int_{\mathbb{R}^3} |u|^2 \langle x\rangle^{\alpha}$ where $\langle x ...
Ali's user avatar
  • 4,143
1 vote
0 answers
117 views

The eigenfunction of modified $1$-laplace equation?

Let $\Omega\subset \mathbb R^2$ be open bounded with smooth boundary. It is well known that the laplace equation $$ -\Delta u=0 $$ has a set of eigenvalues $0<\lambda_1<\lambda_2\leq\lambda_3<...
JumpJump's user avatar
  • 679
2 votes
0 answers
110 views

If $f_j\to f$ in $L^1(\Bbb R^n)$ then $Tf_j\to Tf$ in $L^{1,\infty}(\Bbb R^n)$

Let's define $A:=\{f\in L^1(\Bbb R^n)\cap L^2(\Bbb R^n)\;:\;f\;\mbox{has compact support}\}$. So $A$ is dense in $L^1(\Bbb R^n)$. Given then $f\in L^1(\Bbb R^n)$; by density there exists $\{f_j\}_j\...
user avatar
1 vote
0 answers
71 views

The jump set of $SBV$ function for different value of parameter in image denoising problem

The classical Mumford-Shah image denoisng problem study the minimizer of the following functional, for each $\alpha>0$ where $\Omega\subset \mathbb R^2$ is open bounded with sommth boundary, $$ u_\...
JumpJump's user avatar
  • 679
2 votes
0 answers
86 views

I have an embedding $\iota$ between two Hilbert spaces and want to know if $\iota\iota^\ast$ is something simple like an orthogonal projection

I'm reading A Concise Course on Stochastic Partial Differential Equations. In Proposition 2.5.2 the authors define the notion of a cylindrical $Q$-Wiener process $W$. It turns out that $W$ is just a $...
user avatar
1 vote
1 answer
156 views

Step 2 of The Strichartz's Estimates in Cazenave's Book

My question is from Cazenave's book "Semilinear Schrödinger Equation", page 35. I am stuck with Step 2 of the Strichartz's estimates. The book says that $||\Phi_f(t)||_{L^2}^2=\left(\int_0^t \...
Candidate's user avatar
6 votes
1 answer
2k views

Weak convergence in $H_0^1$ and strong convergence in $L^2$

I'm reading a hand-waving argument in a proof of Chapter 7 of Navier–Stokes Equations by Constantin and Foias. I would like to know if I understand it correctly. Let $\Omega\subset{\mathbb{R}^n}$ be ...
user avatar
4 votes
1 answer
1k views

Density argument with Schwartz functions?

I was wondering whether the Schwartz functions are also dense in $$\{f \in L^2(\mathbb{R}^n); \int_{\mathbb{R}^n} |x|^2 |f(x)|^2 dx + \int_{\mathbb{R}^n}|\xi|^2 |\hat{f}(\xi)|^2 d \xi < \infty\}$$ ...
Leroy's user avatar
  • 129
1 vote
0 answers
192 views

The decay rate of the spectrum of the Gaussian kernel on compact manifolds

It seems that the $k^{th}$ largest eigenvalue of the intergral operator induced on $S^n$ by the Gaussian kernel, $e^{-\frac{\vert \vec{x} - \vec{y} \vert _2^2}{2\sigma^2}}$ decays as $k^{-k}$. This is ...
Student's user avatar
  • 617
4 votes
1 answer
2k views

A continuity/bootstrap argument

I am trying to understand how one can prove the following assertion using a continuity argument: Let $0<\epsilon<\epsilon_0$. Let $I=[t_0,R]$ be a compact interval. Suppose that $S:I\to [0,\...
Gawin's user avatar
  • 175
2 votes
1 answer
374 views

Simplify proof for rapidly decaying functions

I want to show the following theorem in a lecture: Let $F \in C^{\infty}(\mathbb{C}^{k}, \mathbb{C})$ such that $F(0)=0.$ Let $G: \mathbb{R}^n \rightarrow \mathbb{C}^{k}$, $x \mapsto (f_1(x),..,f_k(...
Jonathan's user avatar
  • 181
4 votes
0 answers
131 views

Well-definedness on $C_{0}^{\infty}(\mathbb{R}^{n})$

Let $T$ be a Calderon-Zygmund operator associated to a Calderon-Zygmund kernel $K\in CZK_{\alpha}$ of order $\alpha>0$ and $b\in BMO(\mathbb{R}^{n})$. Then for $f\in C_{0}^{\infty}(\mathbb{R}^{n})$ ...
Timothy's user avatar
  • 355
1 vote
1 answer
129 views

$L^p$-bounding inequality [closed]

Do we have that$$\|Du\|_{L^{2p}} \le C\|u\|_{L^\infty}^{1\over2} \|D^2u\|_{L^p}^{1\over2}$$for $1 \le p < \infty$ and all $u \in C_c^\infty(U)$? Here, $U$ denotes an open subset of $\mathbb{R}^n$.
user avatar
1 vote
0 answers
92 views

Perturbation in Besov space

$\|f\|_{B^{0}_{p,p}}=(\sum_{j\geq -1} \|\Delta_j f\|_p^p)^{1/p}$ is the Besov norm of $f$. Here the Fourier transform of $\Delta_jf~(j\geq 0)$ is $\psi(2^{-j}\xi)\hat{f}(\xi)$ and $\psi$ is a smooth ...
Guohuan Zhao's user avatar
2 votes
1 answer
301 views

Simplicity of eigenvalues

Consider the Sturm-Liouville operator$$Au = -(pu')' + qu \text{ on }I = (0, 1),$$where $p \in C([0, 1])$, $p \ge \alpha > 0$ on $I$, and $q \in C([0, 1])$. No further assumptions are made; in ...
M.S.'s user avatar
  • 369
9 votes
2 answers
553 views

Asymptotic behavior of Sturm-Liouville eigenvalues

I have two questions. Consider the operator $Av = -v'' + a(x)v$ on $I = (0, L)$, with zero Dirichlet condition and $a \in C([0, L])$. Let $(\lambda_n)$ denote the sequence of eigenvalues of $A$....
M.S.'s user avatar
  • 369
0 votes
1 answer
843 views

$C^{\infty}_{loc}$-convergence - right definition

Let $\Omega \subset \mathbb{R}^{n}$ be some open set. Let $f_{n},f\in C^{\infty}(\Omega)$. My question is: What does the following phrase mean? $f_{n}$ converges to $f$ in $C^{\infty}_{loc}(\Omega)$. ...
Ben's user avatar
  • 35
5 votes
1 answer
133 views

If $u \in H^1(U)$, then $Du = 0$ almost everywhere on the set $\{u = 0\}$, auxiliary result

Let $\phi$ be a smooth, bounded and nondecreasing function, such that $\phi'$ is bounded and $\phi(z) = z$ if $|z| \le 1$. Set$$u^\epsilon(x) := \epsilon \phi(u/\epsilon).$$Do we necessarily have that$...
user avatar
2 votes
0 answers
113 views

Continuous inclusions Sobolev theorem, question [closed]

How do I see that if $f$, $g \in H^s(\mathbb{R}^n)$ for $s > n/2$, then $fg \in H^s(\mathbb{R}^n)$ and$$\|fg\|_{H^s(\mathbb{R}^n)} \le C\|f\|_{H^s(\mathbb{R}^n)}\|g\|_{H^s(\mathbb{R}^n)},$$the ...
M.S.'s user avatar
  • 369
0 votes
3 answers
320 views

Exists $C = C(\epsilon, q)$ such that $\|u\|_{L^p(0, 1)} \le \epsilon \|u'\|_{L^1(0, 1)} + C\|u\|_{L^1(0, 1)}$ for all $W^{1, 1}(0, 1)$? [closed]

Let $1 \le p < \infty$. For all $\epsilon > 0$, does there exist $C = C(\epsilon, q)$ such that$$\|u\|_{L^p(0, 1)} \le \epsilon \|u'\|_{L^1(0, 1)} + C\|u\|_{L^1(0, 1)} \text{ for all }u \in W^{1,...
user avatar
-1 votes
1 answer
59 views

Does there exist any subsequence $(u_{n_k})$ converging strongly in $L^q(\mathbb{R})$, for any $1 \le q \le \infty$? [closed]

Fix a function $\varphi \in C_c^\infty(\mathbb{R})$, $\varphi \not\equiv 0$, and set $u_n(x) = \varphi(x + n)$. Let $1 \le p \le \infty$. Does there exist any subsequence $(u_{n_k})$ converging ...
user87775's user avatar
4 votes
2 answers
220 views

existence of a special conformal mapping

Sorry I don't know how to give an appropriate title. In the complex plane, suppose there is a graph $x+if(x)$ separating the plane into two unbounded components, where $f(x)$ is smooth and bounded, ...
qingtang's user avatar
2 votes
1 answer
99 views

Scaling of distributions

Suppose we have a sequence of $L^1(\mathbb{R})$ functions $p_\epsilon$ with $\|p_\epsilon\|_{L^1} \leq 1$ for all $n$. Suppose we know that $p_\epsilon \to 0$ in distributions. Is it obvious that $\...
pde2016's user avatar
  • 21
0 votes
1 answer
94 views

A $W^{1,2}_{loc}$ function with uniformly bounded integrals on compact subsets $W^{1,2}$?

Let $M$ be a Riemannian manifold, $\Omega\subset M$ is an open subset, let $f\in W^{1,2}_{loc}(\Omega)$ with uniformly bounded integrals on compact subset, i.e. there exists a $C>0$, such that for ...
oneyear's user avatar
  • 109
2 votes
0 answers
150 views

Completion of $C_{0,rad}^{\infty}(\Omega)$ with respect to the norm $\|u\|= \Bigg(\int_{\Omega} |\Delta u |^2 \, \mathrm{d}x \Bigg)^{\frac{1}{2}}. $

I have a question that it seems simple but I can not solve it. Let $\Omega$ be the unit ball centered at zero in $\mathbb{R}^N$, $N>4$. Assume that $C_{0,rad}^{\infty}(\Omega)$ is the space of all ...
Hheepp's user avatar
  • 371
1 vote
0 answers
158 views

On the differentiability of a certain map from $ (0,\infty) $ to $ \Bbb{R} $

This problem arose from my study of energy-conservation for non-linear Schrödinger equations. Suppose that we have the following data: $ u \in C^{1} \! \left( (0,\infty),{L^{2}}(\Bbb{R}^{n}) \right) $...
Transcendental's user avatar
5 votes
1 answer
481 views

A continuous path between two Sobolev functions

Let $\Omega\subset \mathbb R^N$ be open bounded, smooth boundary. Let $u_1$, $u_2\in H^{1}(\Omega)$ such that $T[u_1]=T[u_2]=T[\omega]$ where $T$ stands for the trace operator and $\omega\in H^1(\...
JumpJump's user avatar
  • 679
-1 votes
1 answer
226 views

separable BV space for PDE's, Whats stopping us? [closed]

Consider the metric space BV(0,1) with the following metric $$ d(u,v) = \|u-v\|_{L^1} + |TV(u)-TV(v)| $$. It is separable, compact, uniformly bounded and complete. So What is the really obvious thing ...
Rajesh D's user avatar
  • 698

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