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Examples of RKHS that are "classical"

Among the so-called "classical" Hilbert spaces ($L^2$, Sobolev, Hardy, Bergman, etc.), which are very well-studied, which are RKHSs? It is easy to construct example of RKHSs by applying the ...
lost_analyst's user avatar
1 vote
1 answer
294 views

What is the exact description of the homogeneous Besov space $\smash{\dot{B}}^0_{1,1}(\mathbb{R})$?

The Besov space is defined briefly in Wikipedia and I looked for a number of references to find some information on the homogeneous Besov space $\smash{\dot{B}}^0_{1,1}(\mathbb{R})$. However, ...
Isaac's user avatar
  • 3,477
2 votes
1 answer
281 views

Global control of locally approximating polynomial in Stone-Weierstrass?

Let $X=\mathbb{R}$, and $\mathcal{A}:=\mathbb{R}[x]$ be the subalgebra (of $C(X)$) of univariate polynomials. Given $\varphi\in C_b(X)$ and $K\subset X$ compact, we know from Stone-Weierstrass that $$\...
fsp-b's user avatar
  • 463
0 votes
0 answers
138 views

Under what conditions is $\lim_{x\to a}\left|\varphi\circ f(x)-\tau \circ g(x)\right|=0$ true?

This question is inspired from another much easier problem I was trying to solve which I tried to generalize. The question is essentially as follows (assuming all the limits exist) If $a\in \mathbb R\...
Sayan Dutta's user avatar
3 votes
0 answers
124 views

Leibniz rule bound for the inverse of the Laplacian?

Let $f, g \in L^2[\mathbb{T}^2]$ be real-valued functions without zero modes. That is, $\int_{\mathbb{T}^2}f=\int_{\mathbb{T}^2}g=0$. Here, ${\mathbb{T}^2}$ is the $2$-dimensional torus $[\mathbb{R}/\...
Isaac's user avatar
  • 3,477
1 vote
1 answer
197 views

Does convolution with heat kernel converge to pointwise evaluation?

Let $G(t, x) := \frac{1}{\sqrt{4 \pi t}} \exp\left( -\frac{x^2}{4 t }\right)$ for all $(t, x) \in (0, T) \times \mathbb{R}$ be the fundamental solution to the heat equation $\partial_tu = \partial_{...
Hyperbolic PDE friend's user avatar
2 votes
1 answer
61 views

$K *g_n$ converges in the topology of smooth functions, $K$ approximates $\delta(x)$ and $g_n$ is a.e convergent to $g$, then regularity of $g$?

This question is continuation from If $K *g_n$ converges in the Fréchet topology of smooth functions and $K$ approximates $\delta(x)$, is $g_n$ itself convergent? - revised. As before, let us ...
Isaac's user avatar
  • 3,477
3 votes
1 answer
108 views

$L^\infty$ bound of $x^m \psi_n(x)$ where $\psi_n$ is a Hermite function and $m,n \in \mathbb{N}$ - extension from Cramer's inequality

For each $n \in \mathbb{N}$, the Hermite function $\psi_n : \mathbb{R} \to \mathbb{R}$ is a Schwartz function defined by \begin{equation} \psi_n(x):=(-1)^n(2^n n!\sqrt{\pi})^{-1/2} e^{x^2/2} \frac{d^n}...
Isaac's user avatar
  • 3,477
2 votes
0 answers
83 views

Singular integral operators acting on Zygmund class

It is proven in "Classical and Modern Fourier Analysis" by L. Grafakos (Corollary 6.7.2) that if a kernel $K(x)$ defined away from the origin on $\mathbb{R}^n$ satisfies $$\sup_{0<R<\...
MMagana's user avatar
  • 21
2 votes
0 answers
103 views

Schwartz kernel theorem for restricted operators

Let $(M,g)$ be a smooth Riemannian manifold. The celabrated kernel theorem of Schwartz shows that for any linear and continuous operator $A:C_{c}^{\infty}(M)\to C^{\infty}(M)$, there exists a ...
B.Hueber's user avatar
  • 1,171
3 votes
1 answer
219 views

Is there a real/functional analytic proof of Cramér–Lévy theorem?

In the book Gaussian Measures in Finite and Infinite Dimensions by Stroock, there is a theorem with a comment The following remarkable theorem was discovered by Cramér and Lévy. So far as I know, ...
Analyst's user avatar
  • 657
0 votes
2 answers
197 views

Convergence of the infima of convex functions on $\mathbb{R}^m$

Any thoughts on proving the following statement, which is a generalization of the result in convergence of the infima of convex functions from domain $\mathbb{R}$ to $\mathbb{R}^m$ and also Theorem 1 ...
Double Three's user avatar
1 vote
1 answer
263 views

Does global boundedness ruin Stone-Weierstrass denseness?

Let $X$ be any topological space and denote by $\tau_X$ the topology on $C_b(X;\mathbb{R})$ that is induced by the family of seminorms $(\|\cdot\|_\psi\mid\psi\in B_0(X))$ with $\|f\|_\psi:=\sup_{x\in ...
fsp-b's user avatar
  • 463
3 votes
1 answer
166 views

A limit arising from Mellin Inversion: How to compute a specific term of an asymptotic series?

So I am wondering if there exists a general procedure for the following problem: given a monotonically increasing function $f(n)$ which is nonegative on the interval $[0,\infty)$ and grows faster than ...
Sidharth Ghoshal's user avatar
0 votes
1 answer
79 views

Convergence in sequential Lebesgue spaces

Consider a strictly increasing sequence $1\leq q_0<q_n<q_{n+1}<q$ such that $q_n\to q$ as $n\to \infty$. Let $B\subset \Bbb R^d$ be a ball, so that $L^{q}(B)\subset L^{q_{n+1}}(B)\subset L^{...
Guy Fsone's user avatar
  • 1,101
7 votes
2 answers
419 views

A counterexample showing $BV_p \neq AC_p$

I am trying to work through a supposedly simple counterexample given in papers by Love and Gehring regarding a $p$-power generalization of bounded variation and absolute continuity. Let $p > 1$. ...
maxematician's user avatar
3 votes
1 answer
185 views

Uniformly closed ideals of smooth/real analytic functions

Consider $U\subseteq \mathbb{R}^n$ an open subset and denote by $R$ either the algebra of real-valued smooth or real analytic functions on $U$. In either case suppose that $R$ is equipped with the ...
Thomas Kurbach's user avatar
2 votes
1 answer
433 views

Stone-Weierstrass theorem: coefficients of approximating sequence bounded?

Let $X$ be a compact Hausdorff space and $\mathcal{A}$ be a subalgebra of $C(X;\mathbb{R})$. The Stone-Weierstrass theorem asserts that if $\mathcal{A}$ contains the constants and separates the points ...
fsp-b's user avatar
  • 463
1 vote
1 answer
131 views

A generalized form of the approximation to identity?

This question is an extension of the one I posted on ME: https://math.stackexchange.com/questions/4701500/if-alpha-nx-int-lvert-x-y-rvert-leq-1-n-lvert-x-y-rvert2-d-muy It might be elementary for here,...
Isaac's user avatar
  • 3,477
2 votes
0 answers
175 views

Banach space of vector measures

Let $S$ be a set and $\Sigma$ be a $\sigma$-algebra of subsets of $S$. Let $A$ be a Banach space over the field of complex numbers. A countably additive map $\mu:\Sigma\to A$ is called a vector ...
user72829's user avatar
  • 552
1 vote
1 answer
160 views

On an integral equation

Let $B: C^{\infty}([0,1]^3)$ satisfy $$B(t,t,x)=0 \quad \text{for all $t,x \in [0,1]$.}$$ Let $f \in C^{\infty}([0,1]^2)$ satisfy the following integral equation: $$ \int_0^1 f(t,x)\,dx + \int_0^t\...
Ali's user avatar
  • 4,145
1 vote
0 answers
108 views

Existence of a smooth extension

In the three dimensional Euclidean space $\mathbb R^3$ let us define the hypersurface $$ S= \{(x,y,z) \in \mathbb R^3\,:\, z^2= x^2+y^2\}.$$ Suppose that $f \in C^{\infty}(S)$. Does there exist $u\in ...
Ali's user avatar
  • 4,145
0 votes
1 answer
154 views

Finite dimensionality of a subspace

Let $c>0$ and let $Y$ be the space of all distributions of compact support in $(-1,1)$ with singular support at $\{0\}$. Let $X$ be subspace of $Y$ such that for any $\phi \in X$ there holds: $$ \...
Ali's user avatar
  • 4,145
2 votes
0 answers
203 views

Schrödinger representation of the Heisenberg group

Let $\Pi_{\lambda}$ be the the Schrödinger representations of the Heisenberg group $H^n=\Bbb C^n\times\Bbb R$. For $\phi\in L^2(\Bbb R^n)$, we have $$\Pi_{\lambda} (x,y,t)\phi(\xi)=e^{i\lambda t} e^{...
zoran  Vicovic's user avatar
1 vote
1 answer
139 views

Which kind of convergence can we get from Laplace transform convergence?

This question is a related question see this post Vague convergence VS Laplace transform convergence. But now we assume that \begin{equation} \int_0^\infty e^{-sx}\mu_n(dx)\to \int_0^\infty e^{-sx}...
Fractional analysics's user avatar
5 votes
1 answer
340 views

How to give a counterexample of this estimate related to Paley-Littlewood theorem?

I am studying Paley-Littlewood theorem in Harmonic analysis, and I met an exercise. I would like to construct a function $f$ as a counterexample to show that the inequality \begin{equation} \| f \|^...
vent de la paix's user avatar
1 vote
0 answers
99 views

Proving more stronger fomula for discrepancy of a sequence [closed]

I am reading famous book about uniform distribution of sequences by Kuipers and Niederreiter and have questions about solving below exercise from that book. Before going to main exercise I will write ...
unit 1991's user avatar
  • 111
1 vote
1 answer
301 views

Vague convergence VS Laplace transform convergence?

If we assume that $\int_0^\infty e^{-sx}\mu_n(dx)\to \int_0^\infty e^{-sx}\mu(dx), \forall s\geq0$, it is possible to show that $\mu_n\to\mu$ vaguely. Where $\mu_n$ is a measure. Please check here for ...
Fractional analysics's user avatar
0 votes
1 answer
245 views

Riemann-Liouville integral of $f$ is zero implies $f =0$ a.e

The Riemann-Liouville integral is defined by $$ I^\alpha f(x)=\frac{1}{\Gamma(\alpha)} \int_a^x f(t)(x-t)^{\alpha-1} d t $$ where $\Gamma$ is the gamma function and $a$ is an arbitrary but fixed base ...
Grandes Jorasses's user avatar
3 votes
2 answers
382 views

Singular support: equivalent definition

Let $U\subset\mathbb{R}^{d}$ be an open set. The singular support of a distribution $u\in\mathcal{D}^{\prime}(U)$ is defined to be the compliment of the set of points, which have a neighbourhood in ...
B.Hueber's user avatar
  • 1,171
0 votes
0 answers
175 views

Does l2 projection of sequences preserve l1 norm convergence?

Let $\ell^2$ denote the set of square summable sequences with inner product $\langle x,y\rangle=\sum_{i=1}^{n}x(i)y(i)$ and $\ell^2$ norm $\|x\|_2=\sqrt{\langle x,x\rangle}$. Let $\|x\|_1=\sum_{i=1}^{\...
Stephen Berg's user avatar
5 votes
2 answers
708 views

Approximation of Hölder continuous functions "from below"

We assume that we have a $\alpha$-Hölder continuous function $f$ on an interval $[0,1]$ with $f(0)=0$. I am wondering if there exists an explicit construction of a sequence $f_{n} \in C_c^{\infty}(\...
António Borges Santos's user avatar
19 votes
3 answers
1k views

What standard Banach space is isomorphic to the completion of this different normed structure on $\ell^1$?

A colleague asked me the following question: "What can one do with the following norm on $\ell^1$: $|x|=\int_1^2 |x|_pdp$ where $| \;\; |_p$ is the standard norm on $\ell_p$?" This ...
Ali Taghavi's user avatar
7 votes
1 answer
370 views

Duality of $H^1$ and BMO

While proving that the dual of $H^1$ is $BMO$ in Harmonic Analysis: Real-Variable Methods, Orthogonality, and Oscillatory Integrals, page 143, Stein says that we have $\left\Vert g \right\Vert_{H^1} \...
abbyJeffers's user avatar
5 votes
0 answers
417 views

All $L^pL^q$ estimates for the heat equation on $\mathbb R$ (with gain of derivatives)

I have asked this question on MSE, but this is a better place. The heat equation and the heat kernel. Consider the heat equation on $\mathbb R$: $$ \left\{\begin{aligned}u_t-\Delta u&=f\\u(0,x)&...
Lorenzo Pompili's user avatar
1 vote
1 answer
154 views

Dense properties of weighted Sobolev space define on $\mathbb{R}^n$

Consider the usual Sobolev space $H^1(\mathbb{R}^n)$ and $H^1_0(\mathbb{R}^n)$, where $H^1_0(\mathbb{R}^n)$ is the closure of $C_0^\infty(\mathbb{R}^n)$ with respect to the norm of $H^1(\mathbb{R}^n)$....
Houa's user avatar
  • 561
1 vote
2 answers
213 views

How much "room" in inequality $\displaystyle \int_a^b \varphi' ov ~\mathrm{d}x \leq 0$

Let $[a, b]$ be a nonempty interval, $o \in C^1([a, b])$ be such that $o>0$ and $o'<0$ and assume we found some $v \in L^\infty(\mathbb{R})$ such that \begin{equation}\tag{1}\label{1} \int_a^b \...
Hyperbolic PDE friend's user avatar
3 votes
0 answers
156 views

Growth of the constants from the Stone-Weierstrass Theorem

The Stone Weierstrass theorem for $C([0,1])$ claims that for any continuous function $f:[0,1]\to\mathbb{R}$ and each $n\in\mathbb{N}$, there is a polynomial $p_{n,f}(x)=\sum_ia_{f,n,i}x^i$ such that $\...
Saúl RM's user avatar
  • 10.6k
8 votes
3 answers
429 views

A density claim

Suppose that $g_k\in C([1,2])$, $k\in \mathbb N$ are continuous functions such that $\|g_k\|_{C([1,2])} \leq \epsilon^k$ for some sufficiently small $\epsilon>0$. Is the following claim true: If $f\...
Ali's user avatar
  • 4,145
5 votes
1 answer
216 views

Bounds on dimension of a subspace

Let $I=(0,1)$ and let $C>1$ be a constant. Let $L^2(I)$ and $H^1(I)$ be the standard Sobolev spaces on $I$. Suppose that $U$ is a subspace of $H^1(I)$ with the additional property that: $$ \| u\|_{...
Ali's user avatar
  • 4,145
4 votes
1 answer
523 views

Is there any strengthened version of Rademacher's Theorem or any counterexample?

The following theorem is well-known in the ordinary analysis textbook: Theorem: Assume the function $f:U\to\Bbb R^n$ is Lipschitz continuous on an open set $U\subset\Bbb R^m$, then $f$ is almost ...
Wenqing Ouyang's user avatar
0 votes
1 answer
281 views

Roots of linear combination of $x \sin x$

Let $\theta=(\theta_1,\theta_2,\cdots \theta_n)$, and $a_{ij}$ are constants. There is no condition on the positiveness of $a_{ij}$. Under which condition on $\theta$, such that the following function ...
tony's user avatar
  • 405
2 votes
2 answers
281 views

Most general reverse Hölder inequality for polynomials

Theorem. Let $m$ be an integer and $P_m$ the vector space of degree $m$ polynomials in one real variable. There is a constant $C$ such that, for all $a<b$ and $p \in P_m$, $$\|p\|_{L^\infty(a,b)} \...
Sébastien Loisel's user avatar
3 votes
1 answer
100 views

Vague Topologies induced by $C_c$ and $C_0$ are the same on a closed ball of finite Radon measures?

Let $X$ be a locally compact Hausdorff space. Denote $C_c(X)$ and $C_0(X)$ the space of continuous functions with compact support and vanishing at infinity respectively. By Riesz representation ...
user141240's user avatar
0 votes
2 answers
166 views

Asymptotics of the unique root of a polynomial equation defined as a sum of rational expressions

Let $\lambda_1\ge \ldots \ge \lambda_n \gt 0$. Define a function $F:\mathbb R_+ \to \mathbb R_+$ by $$ F(t) = t^2\sum_{i=1}^n\frac{\lambda_i^2}{(\lambda_i + t)^2}. $$ It is clear that $F$ is strictly ...
dohmatob's user avatar
  • 6,853
1 vote
0 answers
64 views

Sequential Hölder-norm for functions in $H_{\alpha}([0,1]^{d})$?

I have come across a nice result attributed to Ciesielski (Ciesielski, Z. (1960). On the isomorphisms of the spaces $H_{\alpha}$ and m. Bull. Acad. Pol. Sci. Ser. Sci. Math. Phys. 8, 217–222.), even ...
BabaUtah's user avatar
  • 149
1 vote
0 answers
106 views

Question on the existence of a certain decomposition method for real square matrices

I was working around with the decomposition of the multidimensional linear canonical transform (which is not even continuous w.r.t. the parameters) into a few fractional Fourier transforms (and other ...
Kanghun Kim's user avatar
9 votes
4 answers
2k views

How may I find all continuous and bounded functions g with the following property?

Find all continuous and bounded functions $g$ with : $$\forall x \in \mathbb R, 4g(x)=g(x+1)+g(x-1)+g(x+\pi)+g(x-\pi).$$ I have posted this question here, but received no answer.
Dattier's user avatar
  • 4,074
0 votes
0 answers
142 views

Is $C^\infty(\Omega) \cap W^{s_1,p_1}(\Omega)$ dense in $W^{s_2,p_2}(\Omega)$ if $W^{s_1,p_1}(\Omega) \subset W^{s_2,p_2}(\Omega)$?

Background: The proof of Theorem 6.4 in http://mate.dm.uba.ar/~jrossi/Fractional-1-lapla-07_02_2015.pdf, I want to use the density that $C^\infty(\Omega) \cap W^{r_0,q_0}(\Omega) \cap L^2(\Omega)$ is ...
Dokem's user avatar
  • 1
2 votes
1 answer
60 views

Specific estimation of the norm for a linearly transformed function in $\mathcal{S}_0^{\beta}(\mathbb{R}^n)$

According to the standard definition, $\mathcal{S}_0^{\beta}(\mathbb{R})$ is a subspace of smooth functions on $\mathbb{R}$ with the property that \begin{equation} \lvert x^k f^{(q)}(x) \rvert \leq CA^...
Isaac's user avatar
  • 3,477

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