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Plancherel-Polya Type Inequality for non-compactly Fourier-supported Functions??

Hi! The Plancerel-Polya inequality can be stated as follows: Let $0 < p\le \infty$ and $ \nu \in \mathbb{Z}$. Suppose that $g$ is a (smooth) function satisfying $\mbox{supp }\hat g \subset \...
Philipp's user avatar
  • 979
1 vote
0 answers
205 views

Uniqueness for Volterra equation with initially (linearly) unbounded kernel

Letting $D:=\{(x,y):\ 0\leq x\leq y\leq1 \text{ and } y>0\}$, I have a continuous function $k:D\to[0,\infty)$ that satisfies some properties that I list below. I'm interested in continuous and ...
e.lipnowski's user avatar
1 vote
1 answer
120 views

Characterization of an integral operator with a Bessel kernel

I am considering the following integral operator: $$K(\sigma)(\theta)=\int_0^{2\pi} \sigma(\theta') J_0(|e^{i\theta}-e^{i\theta'}|)\,d\theta',$$ where $J_0$ is the Bessel function of order $0.$ I am ...
Didier Felbacq's user avatar
1 vote
0 answers
119 views

Continuity of a minimizing measure w.r.t a parameter

Let $V_t(x)=x^2+t\phi(x)$ where $t>0$ and $\phi\in C^\infty_c(\mathbb{R})$. My question is what can be said about the continuity of the (unique) minimizer (among probability measures) of the ...
BlueCharlie's user avatar
1 vote
0 answers
100 views

N-wave solution of conservation law $u_t + (u - u^2)_x = 0$

How can we compute the "N-wave" source-solution of the conservation law $$u_t + (u - u^2)_x = 0, $$ that is, the entropy solution of this conservation law with the initial data $u(0,\cdot) = ...
Riku's user avatar
  • 839
1 vote
0 answers
47 views

Scaling limit of transport equation with double-well potential

Let us consider the transport PDE $$ u^\epsilon_t + u^\epsilon_x= -\frac{1}{\epsilon} W'(u^\epsilon) $$ where $W$ is a double-well potential -- for example, $W(x)=\frac{1}{4}(x^2-1)^2$ so that the PDE ...
Riku's user avatar
  • 839
1 vote
0 answers
59 views

Identification of a limit point of a sequence of solution of ODE

Let $v^0$ and $v^1$ be the following vector fields over $\big(\mathbb{R}_+^*\big)^3$: for $x\in\big(\mathbb{R}_+^*\big)^3$ and $1\leq i\leq 3$, \begin{align*} & v^0_i(x)=x_i(x_{i-1}-x_{i+1}) \\ &...
G. Panel's user avatar
  • 449
1 vote
0 answers
278 views

Vector convolution?

I am working on a research problem which leads to the following optimization problem: \begin{equation} \hat{M} = \operatorname*{arg\,max}_M \Bigl\lVert\sum_{k=0}^{M-1} {\mathbf y}_k \exp\left(-j 2\pi ...
Mamal's user avatar
  • 273
1 vote
0 answers
99 views

Estimate on integral with logarithmic weight

Let $f:\mathbb R^n \to \mathbb R$. What (minimal) assumptions are needed, in addition to $f \in L^1 \cap L^\infty$, to have $$ \int_{\mathbb R^{2n}} \frac{|f(x)-f(y)|}{(|x-y|+\epsilon)^{n+1}} \, dx \, ...
Riku's user avatar
  • 839
1 vote
0 answers
72 views

Initial-boundary value problem for transport equation with $W^{1,p}$ velocity

Let us consider $v:\mathbb R_+ \times \mathbb R \to \mathbb R_+$ such that $v \in L^1(0,\infty, W^{1,p}(\mathbb R))$ and the transport equation $$ \begin{cases} u_t + v(t,x) u_x = 0 \qquad & (...
user175203's user avatar
1 vote
0 answers
94 views

Obtaining identity from Pokhozhaev formula

From the classical Pokhozhaev formula, how can I obtain that the following identity holds for $u,v \in C^2(\bar \Omega)$? $$ \int_\Omega (\Delta u(x,\nabla v) + \Delta v(x,\nabla v)) dx = \int_{\...
Lao's user avatar
  • 217
1 vote
0 answers
258 views

Cut-off function and fractional Laplacian

Is there a smooth function $u$ such that $u = 1$ in $B_r(0)$, $u=0$ in $\mathbb R^N \setminus B_{2r}(0)$, and $$ |\nabla u| \le Cr^{-1}, \quad |\Delta u |\le Cr^{-2}, \quad |(-\Delta)^s| u \le Cr^{-2s}...
user173196's user avatar
1 vote
0 answers
144 views

Liouville theorem for elliptic equation with advection term

How can one prove that any $L^2$ solution of $$ - \Delta \phi(x) + a(x) \cdot \nabla \phi(x)=0 \qquad \mbox{in } \mathbb R^N $$ is zero if $a(x)$ is a divergence-free vector field such that $\int |\...
user173196's user avatar
1 vote
0 answers
130 views

Fractional Sobolev embedding theorem

Let $\psi \in C^\infty_c(\mathbb R^N)$ be a test function with support iN $B(0,R)$. Is it true that the following inequality holds $$\int_{B(0,R)} \psi^2 u^{\frac{4}{1+\beta}} dx \le R^{1+\beta} \int_{...
user173196's user avatar
1 vote
0 answers
60 views

A determinantal mixture of probability densities

I came up with this operation after playing with determinantal point processes: Given two probability densities $f,g$ defined on some measurable space with reference measure $\mu$, set $$ f\star g(x)...
Adrien Hardy's user avatar
  • 2,135
1 vote
0 answers
76 views

Existence of a `right' sequence

Suppose that $f_n: \mathbb{R} \times [0,\infty) \to \mathbb{R}$ is a sequence of bounded variation functions such that there exists $C>0$: $|f_n| < C$ for every $n$ and, as $n \to \infty$, for $...
Manolis D's user avatar
1 vote
0 answers
177 views

A consequence of De Giorgi oscillation lemma

The following lemma is true (see DeGiorgi oscillation lemma) Let $u$ be a subsolution of $$\mathrm{div}(A(x)\nabla u) = 0,$$ where $A$ is bounded, measurable and uniformly elliptic ($C^{-1}\...
Riku's user avatar
  • 839
1 vote
0 answers
107 views

Level sets of a BV function and its derivative

Given $u \in BV(\Omega; \mathbb{R}^M)$, where $\Omega \subset \mathbb{R}^N$, what is the relationship between its level sets and its distributional derivative $Db$? More specifically, does Alberti ...
Riku's user avatar
  • 839
1 vote
0 answers
97 views

Fredholm integral equation of third kind

Let us consider the following integral equation $$a(x)u(x) + \int\limits_0^2 {K(s,x)u(s)ds} = f(x)$$ Let f in $L^p(0,1)$ for some $p \in [1,\infty]$ and let $K \in L^q((0,2) \times (0,1))$. Assume ...
Gustave's user avatar
  • 617
1 vote
0 answers
110 views

Using semigroup theory for nonautonomous semilinear equations

We have the abstract evolution equation $$U^{\prime}=A(t)U+F(U), \quad U(0) = U_0.$$ If the operator $A$ is independent of time, we can get local existence of solutions by proving that $A$ is the ...
Houria Chell's user avatar
1 vote
0 answers
324 views

Conditions for Poisson summation (for discontinuous functions)

Let $G$ be an locally compact abelian group with $\Gamma$ a discrete cocompact subgroup. I'm looking for precise conditions by which Poisson summation formula holds. That is, for some function $f$ on $...
Tian An's user avatar
  • 3,799
1 vote
0 answers
237 views

On the bound of the Stein-Wainger oscillatory integral

Let $\lambda\in \mathbb{R}$, $\phi\in C^\infty(\mathbb{R})$. We define the Stein-Wainger oscillatory integral by $$I=p.v.\int_\mathbb{R} e^{i\lambda\phi(t)}\frac{dt}{t}.$$ Stein-Wainger [1] showed ...
orange's user avatar
  • 11
1 vote
0 answers
146 views

Functional equation with Fourier transform

What are the continuous functions $f$ such that on $\mathbb{R}^{+*}$: $$f(x) - \frac{C}{x} \hat{f}(\frac{1}{x}) =x^{\alpha}$$ Where $\hat{f}$ is the Fourier transform of $f(|x|)$ and $C$ a constant....
Bertrand's user avatar
  • 1,199
1 vote
0 answers
183 views

Trace theorem for boundary value problem

Consider the inhomogeneous boundary value problem on the infinite strip $(x,y)\in \mathbb{R}\times [0,1]$ defined by $$\begin{cases}\partial_{x}u + \partial_{y}v=f & {(x,y)\in \mathbb{R}\times (0,...
Matt Rosenzweig's user avatar
1 vote
0 answers
66 views

How to define spectral multiplier for −Δ?

Put $e_{n}(t)=e^{int}=\prod_{j=1}^{d}e^{in_{j}t_{j}}$, $t\in \mathbb T^d, n\in \mathbb Z^d.$ ($t=(t_{1},..., t_d), n=(n_1,..., n_d)$) We note that $\{e_{n}\}_{n\in \mathbb Z^d}$ forms an orthonormal ...
abcd's user avatar
  • 233
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
86 views

Least restrictive condition such that $-y''(x)+q(x)y(x)=\lambda y(x)$ has two solutions

Let $\lambda \in \mathbb{R}$ and consider some function $q$ on the interval $[0,1].$ What is known to be the least restrictive condition on $q$ such that there are two linearly independent $H^2$ ...
Tibert's user avatar
  • 11
1 vote
0 answers
148 views

References for the Sturm oscillation theorem

What is the most general form of the Sturm oscillation theorem? So far I have only seen cases that treat either unbounded intervals or weighted $L^2$ spaces. I would be especially interested in ...
pwl's user avatar
  • 263
1 vote
0 answers
93 views

inverse problem to resolution of the identity

Suppose $f_\lambda(x),\lambda \in \mathbb{R}$ is a continuous/smooth family of bounded function on $\mathbb{R}$. Given a measurable set $\mathfrak{m}$ on $\mathbb{R}$, define $$E_\mathfrak{m}:L^2\...
Qijun Tan's user avatar
  • 587
1 vote
0 answers
86 views

Asymptotics of a elliptic pde when exponent gets large

I am interested in the following pde $$ -\Delta w_p + \left( \frac{1}{p-2} +1 \right) \frac{ | \nabla w_p|^2}{w_p} + \epsilon(p) \left( \frac{1}{w_p} \right)^{(p-2)} = (p-2) w_p $$ in the unit ball $...
Math604's user avatar
  • 1,385
1 vote
0 answers
129 views

persistence of regularity for nonlinear Klein-Gordon equation

I have been reading the paper on nonlinear Klein-Gordon equation(NLKG) for initial data in modulation space: For detail please see the paper "Klein-Gordon Equations on Modulation Spaces (2014)" (...
Inquisitive's user avatar
  • 1,051
1 vote
0 answers
133 views

Condition for boundedness in stationary phase theorem

I am trying to understand theorem 7.7.1 in Hormander's Analysis of linear partial differential operators, vol.1. Let $K \subset \mathbb{R}^n$ be a compact set, $X$ an open neighborhood of $K$ and $j, ...
teagut's user avatar
  • 93
1 vote
1 answer
416 views

Limit-circle and limit-point at endpoints

I was wondering if the following holds: If you have an ODE $$-y''(x) + q(x) y(x) = \lambda y(x)$$ on a finite interval $(a,b)$ and you know that this equation is limit-circle or limit-point at the ...
Fabiano's user avatar
  • 13
1 vote
0 answers
136 views

A linear operator equation (PDE) with non-monotone term

I'm interested in the existence and/or uniqueness to the following problem. Let $V$ and $H$ be Hilbert spaces and $V \subset H \subset V^*$ form a Gelfand triple. There is a linear operator $L:{D}(L) ...
AACA's user avatar
  • 11
1 vote
0 answers
182 views

Laplacian mapping on various function spaces

I have a question related to a certain elliptic operator on $R^N$ but I think i can clarify my confusion if I just consider the Laplacian $\Delta$ on the unit ball in $R^N$. If $ 1 <p< \infty$...
Craig's user avatar
  • 539
1 vote
0 answers
1k views

Inverse Transpose of Jacobian Matrix

Let $f:\mathbb{R}^n\mapsto\mathbb{R}^n$ be a bijective function. Fixed $a\in\mathbb{R}^n$. For any $x$ closes to $a$, using Taylor's series we can approximate $f(x)$ by \begin{equation} f(x)\approx f(...
Jlamprong's user avatar
  • 133
1 vote
0 answers
135 views

growth bound for solution of an ordinary integro-differential equation

I am considering the following ordinary integro-differential equation $$ A g = \sigma^2(y) + \int_\mathbb{R} \nu(y,dz) z^2 $$ where $$ A = b(y) \partial + \frac{1}{2} \sigma^2(y) \partial^2 + \int_\...
user26807's user avatar
1 vote
0 answers
100 views

Conditions on a measure to satisfy certain relation on moments.

Suppose we have a measure $\mu$ on $\mathbb R_+$ such that $\forall s>-1$ $t^s\in L^1(\mathrm d\mu(t))$. I'd like to impose some conditions on $\mu$ so the function $$f:p\to \frac{\int_0^\infty t^...
TZakrevskiy's user avatar
1 vote
0 answers
121 views

showing convergence of a function recursion relation

I have obtained (formally) a perturbative solution $$ H(y) = \sum_{n=0}^\infty \delta^n H_n(y) $$ to the following integro-differential equation ($\delta$ is a small constant, $\nu$ is a L\'evy ...
psyduck's user avatar
  • 351
1 vote
0 answers
180 views

iterated traces for sobolev functions

It is well known that if $M$ is a smooth $(n-1)$-dimensional surface in $\mathbb R^n$ (e.g. a subspace) then there is a continuous trace operator $W^{s,p}(\mathbb R^n)\to W^{s-1/p,p}(M)$. Now suppose ...
Mircea's user avatar
  • 2,041
1 vote
0 answers
693 views

A question about an equivalent definition of the Schwartz distribution

Hello, Does anyone know a reference or proof of the "if" part of the following statement? $$ \mu\in \mathcal{S}'(R)\quad\text{if and only if}\quad \mu*\alpha\in\mathcal{S}(R),\forall \alpha\in C_c^\...
Anand's user avatar
  • 1,649
1 vote
0 answers
477 views

A norm ratio inequality

Let $y,z\in(0,1)^n$ satisfy $||y||_1 = ||z||_1=1$. Then $$ \frac{||z||_3}{||z||_2} \le K_n ||z/y||_\infty \frac{||y||_3}{||y||_2} $$ where $z/y\in\mathbb R^n$ is the coordinate-wise quotient of $z$ ...
Aryeh Kontorovich's user avatar
1 vote
2 answers
515 views

continuity of extension of maps along curves

Let $a\le b$ and $k\ge 0$ be given and fixed. Let furthermore $x$ and $y$ denote two different elements of a Hilbert space $H$. Suppose $u:\mathbb{R}\rightarrow H$ is a $C^k$-embedding connecting $x$ ...
Orbicular's user avatar
  • 2,935
1 vote
0 answers
283 views

Density of Dolean exponentials in L2 and Wiener Measure

Assume that W is the classical Wiener space C([0,1],R) note $\mu$ the Wiener measure, and denote by $\mu_s$ the image of $\mu$ under the maping $T: W ->W$ such that$ T(w)= \sqrt(s) w$ . Denote by $...
Syd L's user avatar
  • 19
1 vote
1 answer
268 views

Best constant for Hölder inequality in Lorentz spaces

It's well known (and proved by R. O'neil) that there is a version of Hölder's inequality for Lorentz spaces, namely $$\|fg\|_{L^{p, q}} \lesssim_{p_1, p_2, q_1, q_2} \|f\|_{L^{p_1, q_1}}\|g\|_{L^{...
Joshua Isralowitz's user avatar
0 votes
2 answers
162 views

Superquadratic boundedness from $L^2$ convergence

Assume $f_n,f\in L^2(\mathbb{R}^3)$ and $f_n\to f$ strongly in $L^2$. It seems there is a common fact that there exists a superquadratic maps $\beta\in C([0,\infty);[0,\infty))$ such that $\beta(0)=0$,...
WPJ's user avatar
  • 71
0 votes
1 answer
59 views

Given positive $\epsilon$ and $c$, find a density $\phi$ such that $t\phi(\epsilon/t) \ge c \|\phi'\|_\infty$ for all positive $t$

A nice density (on $\mathbb R$) is function $\phi:\mathbb R \to \mathbb R$ such that (1) $\phi(x) \ge 0$ for all $x \in \mathbb R$, (2) $\int_{-\infty}^\infty \phi(x) \mathrm{d}x = 1$, (3) $\phi$ is ...
dohmatob's user avatar
  • 6,853
0 votes
1 answer
239 views

A proof for the existence of smooth solution of PDE in form $\Delta u=f(x, u)$ in Michael E. Taylor's book Partial Differential Equations III

This part is from page 107 in Michael E. Taylor's book Partial Differential Equations III. In this part, we want a proof for the existence of smooth solution of the PDE $\Delta u=f(x, u)$ on $U$ with ...
Elio Li's user avatar
  • 809
0 votes
2 answers
388 views

Derivative of fractional Laplacian is the fractional Laplacian of the derivative

Is it true that $$\partial_x ((-\Delta)^s u(x)) = ((-\Delta)^s \partial_x u(x))?$$
user avatar
0 votes
2 answers
425 views

A book about almost periodic functions [closed]

Can anyone give me suggestions for new books about Besicovitch's almost periodic functions? Thanks a lot.
Madarb's user avatar
  • 153