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Questions tagged [integral-operators]

This tag is for questions relating to integral operators, which are an important special class of linear operators that act on function spaces.

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Is the convolution with a Gaussian kernel injective?

I am a beginner in the theoretical aspects of kernels. From some tutorials I find that the Fourier transform of a Gaussian kernel is another Gaussian, which is non-zero everywhere in the frequency ...
Jean-Philippe's user avatar
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Sub-majorization for functions on measure spaces

I want to learn about majorization and submajorization theory on $\sigma$-finite measure spaces. I know things get a bit more complicated compared with the case of finite measure spaces, but I'm ...
Lau's user avatar
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approximate measurable functions on a product measure space

Does anyone know a reference on the result in the picture? I believe there should be one, at least for (p=q=2). Here, $$\|f\|_{p,q}:= \left(\int_X\left(\int_Y|f(x,y)|^q d \mu_Y(y)\right)^{p/q} d \mu_X(...
C. Ding's user avatar
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On the compactness of the square of a finite double norm integration operator $T$ on $L^1 (\mu)$.

Good morning everyone, I have read in S. P. Eveson, Compactness Criteria for Integral Operators in L∞ and L1 Spaces, Proceedings of the American Mathematical Society 123, 1995, 3709-3716 : "If $(...
thibault jeannin's user avatar
2 votes
2 answers
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A bounded linear operator on the space of real polynomials on $[0,1]$ with unbounded inverse operator

I'm trying to do Question 6(ii) on this pdf Let $X$ be the space of real polynomials on $[0,1]$ regarded as a subspace of the Banach space $C[0,1]$ of continuous functions equipped with the sup norm. ...
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Lower Bounds for the Operator norm of Integral Operators with square-integrable kernels

Let $k$ be a measurable function on $E\times E$ where $E \subset \mathbb{R}^2$, define the integral operator $L_k$ by $$ L_k f(x) = \int_{E} k(x,y) f(y) dy, \qquad x \in E $$ If $k$ is is square-...
WeakLearner's user avatar
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Hilbert-Schmidt integral operator without second integrable kernel

From this webpage, we know that if $X$ is a measurable space ($\sigma$-algebra is omitted) and $\mu$ is the measure, $K(x,y) \in L_2(X\times X,\mu\times \mu)$, we can define the following operator ...
efsdfmo12's user avatar
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What guarantees that the adjoint of a suitable integral operator, e.g. a Hilbert-Schmidt operator, is again an integral operator with a kernel?

This is likely a silly question, but I was wondering if $T$ is some nice integral transform, e.g. a Hilbert-Schmidt integral operator, with an, say, $L^2(\mathbb{R}^n)$ kernel, what then guarantees ...
Cartesian Bear's user avatar
2 votes
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Integral Over Two Kernels

I have the following problem, which is a variation of problem 2.1.3 in Conway's "A Course in Functional Analysis": Let $(X,\mathcal{M},\mu)$ be a $\sigma$-finite measure space. Let $k_1,k_2$...
CauchyChaos's user avatar
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How do I prove that an integral operator is invertible.

I am working with an operator $L$ defined as follows, $$(Lf)(x',y') = \int_{x,y}f(x,y)g(x,y)T(x',y'\vert x,y) dxdy,$$ where $x,y,x',y' \in \mathbb R$, functions $f,g: \mathbb R^2 \rightarrow \mathbb R^...
sp1122's user avatar
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About Fourier integral operator

Consider the operator $$(A_\Delta\psi)(p) = \int_\Delta \int_{\mathbb{R}^n} e^{ix\cdot(p-k) + i\phi(x,p,k)} a(x,p,k) \psi(k) dk\: dx$$ where $\Delta$ is a Borel or Lebegue set in $\mathbb{R}^n$, in ...
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Solving an Integral Equation Using Neumann Series in $C([0,1])$

Question: Let $U, V \subset \mathbb{R}^d$ be compact, $K \in C(U \times V)$ and $T_K: C(V) \rightarrow C(U)$ given by $$ T_K(u)(x)=\int_V K(x, y) u(y) d y $$ Let $U=V=[0,1] \subset \mathbb{R}$. Show ...
CanDoMajoringMath's user avatar
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How to Prove $T_K\left(B_1(0)\right)$ is Precompact in $C(U)$ for a Kernel Operator $K$ in $\mathbb{R}^d$

Question: Let $U, V \subset \mathbb{R}^d$ be compact, $K \in C(U \times V)$ and $T_K: C(V) \rightarrow C(U)$ given by $$ T_K(u)(x)=\int_V K(x, y) u(y) d y . $$ Prove that $T\left(B_1(0)\right)$ is ...
CanDoMajoringMath's user avatar
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How to Prove Linearity and Compute the Norm of $T_K$ for a Compact Kernel in $\mathbb{R}^d$?

Hi all this is my question: Let $U, V \subset \mathbb{R}^d$ be compact, $K \in C(U \times V)$ and $T_K: C(V) \rightarrow C(U)$ given by $$ T_K(u)(x)=\int_V K(x, y) u(y) d y . $$ (i) Show that $T_K \in ...
CanDoMajoringMath's user avatar
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Compactness of integral operators

came across this exercise I haven't been able to solve. I saw a very similar exercise (to prove an integral operator with a kernel is compact), but it is just different enough, I think, to warrant its ...
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Is the point-spectrum of bounded linear integral operators always countable?

I would like to know whether bounded linear integral operators (defined on a separable Hilbert space of functions) always have a countable point-spectrum. Or if not, what would be a practical ...
Cyril Soler's user avatar
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General properties of integral operators

I study integral operators and I have several questions for which I didn't find answers. I'm looking for references in the first place, books, where this questions discussed. Here are the questions: ...
Big Coconut's user avatar
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1 answer
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Bounded transition kernel and finite transition kernel

I have been studying transition kernels recently from "Probability and Stochastics" by Erhan Cinlar. To avoid any ambiguity, a transition kernel in my textbook is defined as a mapping \begin{...
Fran712's user avatar
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Operator in function spaces

Suppose I define the integral Operator $T:L^{\phi}(X)\to L^{\psi}(X)$ by $(Tf)(x)=\int_{X}K(x,y)f(y)d\mu$
Andyale's user avatar
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Integral representability of compact operators on L_2

Let $\Omega$ be a bounded Lipschitz domain and $K: L_2(\Omega) \to L_2(\Omega)$ a compact linear operator. Does $K$ in general have an integral representation, i.e., is there an integrable function $k ...
bheinzek's user avatar
3 votes
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Boundedness of integral operator induced by kernel $K(x,y) := \frac{1}{x+y}$.

Let $t_0 > 0$, $p \in (1,+\infty)$ and define $K:(0,t_0)\times (0,t_0) \rightarrow \mathbb{R}$ by $K(x,y) := \frac{1}{x+y}$. Is it true that for all $f \in L^p\bigl((0,t_0);\mathbb{R}\bigr)$ the ...
freiszo95's user avatar
1 vote
1 answer
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Equivalence between trace-class and convergence of the kernel integral.

It is known that when a bounded integral operator $T$ on $L^2(S)$ with kernel $k: S^2\rightarrow \mathbb C$ is trace-class, then we have (See for instance Functional Analysis, Peter Lax, p346) $$\mbox{...
Cyril Soler's user avatar
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93 views

What happens to a kernel matrix if you divide each row by its sum?

Assume we have a kernel function k(x,y), and calculate the kernel matrix $ K = K_{ij} = k(x_i,x_j)$ for a finite dataset consisting of m points. One interest of mine is to calculate the eigenvalues ...
probgus's user avatar
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4 votes
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Find adjoint to integral operator from $H^1$ to $L_2$

Let $k(x, y): \mathbb{R}^2 \to \mathbb{R}$ be a kernel and $T: H^1(a, b) \to L_2(c, d)$ $$ T u(x) = \int\limits_{a}^{b} k(x, s) u(s) ds$$ Find the adjoint operator $T^*$. It is easy to see the if $T: ...
Leroy's user avatar
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Spectrum of the integral operator $A(f)(x)=\int_{[0,2\pi]}\frac{\sin(n\frac{x-y}{2})}{\sin(\frac{x-y}{2})}f(y)dy$ where $A:L^2(0,2\pi)\to L^2(0,2\pi)$

I want to understand the spectrum of the integral operator $A$ from $L^2(0,2\pi)$ to itself, given by $$A(f)(x):=\int_{[0,2\pi]}\frac{\sin(n\frac{x-y}{2})}{\sin(\frac{x-y}{2})}f(y)dy$$ where $n$ is a ...
Frht's user avatar
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Finding norm of the integral operator with non-integral part

Studying functional analysis, I was asked if I could determine the norm of the following functional $l:C[0,\pi]\rightarrow \mathbb R$ $$l(x)=x(0)-x(\pi/4)+\int\limits_{0}^\pi x(s)\sin sds$$ I'm ...
Big Coconut's user avatar
3 votes
0 answers
234 views

Compactness of the convolution integral operator

I have a problem in an exercise and I would be grateful for hints. I have to show that if $ f \in L^1(\mathbb{R}^n)$, the integral operator $$\begin{array}{rcl} T_f: L^p(\Omega)& \to& L^p(\...
motionart's user avatar
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2 votes
2 answers
306 views

Integral operator and the kernel function

Let $D$ be an open bounded set in $\mathbb{R}^{n}$. Let $p \in [1,\infty)$, and $q$ is the dual exponent to $p$. Assume that $K : \mathbb{R} \times D \rightarrow \mathbb{R}$ is a bounded continuous ...
Boris G's user avatar
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1 answer
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Bounding the trace-class norm of integral operator on $L^2(\mathbb{R})$

Consider an integral operator on $L^2(\mathbb{R})$ with kernel $K : \mathbb{R}^2 \to \mathbb{C}$. My question is if it is possible to bound the trace-class norm of $T$ based on properties of $K$? This ...
SweSnow's user avatar
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0 answers
105 views

Krein-Rutman theorem for kernel operators

For a matrix $A \in \mathbb{R}^{n \times n}$, we have the well-known Perron-Frobenius-Theorem which among other things establishes the following properties: If $A$ is positive (i.e. $A_{ij}>0 \ \...
a_student's user avatar
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An eigenfunction inequality for integral operators

I have an integral operator $T$ defined with respect to a positive semidefinite kernel function $k: \mathbb{R} \times \mathbb{R} \rightarrow \mathbb{R}$ probability measure $\mu(dx) = p(x) dx$ defined ...
forky40's user avatar
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1 answer
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How to prove that the range of this integral operator $T$ is $L^2[a,b]$?

The operator is $Tf= g(t)+ \int_{a}^{t}(K(t,s)f(s)ds.$ The proof assumes that $g(t) \in L^2[a,b]$ so I believe I need to only prove that $\int_{a}^{t}(K(t,s)f(s)ds \in L^2[a,b]$. I started off this ...
ali's user avatar
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Averaged matrix exponential inverse

Let $H$ be a given symmetric matrix, i.e., $H\in\mathbb{R}^{d\times d}_{\rm sym}$, $d\geq1$. The operator $T$ is given by $$TX=\int_0^1e^{(1-s)H}Xe^{sH}\mathrm{d}s,\qquad X\in\mathbb{R}^{d\times d}_{\...
Bati's user avatar
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1 vote
2 answers
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Kernel operators on AL-spaces

Let $E$ be an AL-space. For simplicity $E=L_{1}(X,\Sigma,\mu)$, where $(X,\Sigma,\mu)$ is a strictly localizable measure space. Let $T:E\rightarrow E$ be a bounded kernel operator on $E$ with ...
user44155's user avatar
6 votes
1 answer
374 views

Compact integral operator on $H^1(\mathbb{R})$

Consider the operator $$ {\mathcal{L}}v=e^{-x}\int_{0}^x v(y)\, dy. $$ Is the operator ${\mathcal{L}}$ compact as an operator from $H^1({\mathbb{R}^+})$ to itself? To give some context to the problem ...
Gateau au fromage's user avatar
2 votes
0 answers
147 views

Structure of the Inverse of a Fredholm integral operator of the second kind

NOTE: Cross-posted on MathOverflow I am trying to solve an equation of the form $$ (\mathbb{I} + K)\phi = f $$ where $(\mathbb{I} + K): L^2([0,1];\mathbb{R}) \rightarrow L^2([0,1];\mathbb{R}) $ is a ...
a1228d's user avatar
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2 votes
1 answer
192 views

integral operator with continuous integrable function

Let $k: [0,\infty) \mapsto \mathbb{R}$ be continuous and $\int_{0}^{\infty} |k(x)|dx < + \infty$. Set $(Af)(x)=\int_{0}^{\infty} k(x+y) f(y) dy, f \in L^2(\mathbb{R})$. Show that $A$ is bounded and ...
undefined's user avatar
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1 vote
1 answer
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Examples of Continuous Functionals and Operators

I am currently working trough the chapter 2.10 in the book "Spectral Theory of Self-Adjoint Operators in Hilbert Space" (https://link.springer.com/book/10.1007%2F978-94-009-4586-9). This ...
Kiwi_98's user avatar
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0 votes
1 answer
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Compactness of convolution operator

Let $k$ be a bounded continuous function that is strictly positive and $\lim_{|x|\to\infty} k(x) \to 0$ and also $k \in L^1(\mathbb R)$. The question is, if the integral operator $T: C_b^0(\mathbb R) \...
SPSS's user avatar
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1 vote
0 answers
101 views

Is the integral operator with continuous kernel from $H^{-\frac 1 2}(\partial\Omega)$ to $H^{\frac 1 2}(\partial\Omega)$ a compact operator?

For a bounded domain $\Omega$ with $C^1$ boundary, define a integral operator $A$ with a continuous kernel $k$ satisfies $$ A f (x) = \int_{\partial\Omega} k(x,y)f(y)~{\rm d}y \quad {\rm for }~x\in\...
Xuan's user avatar
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1 vote
0 answers
154 views

Numerical methods for computing singular value decomposition of integral operator

Consider a Hilbert-Schmidt integral operator $T:L^2(\mathbb{R}^n)\rightarrow L^2(\mathbb{R}^n)$, whose explicit mapping is given by \begin{align} f(y)\mapsto \int k(x,y) f(y) dy. \end{align} Hopefully,...
Heedong Do's user avatar
3 votes
0 answers
99 views

Kernel of Continuous Functional Calculus of Integral Operator

Suppose we have a symmetric bounded function $k:[0,1] \times [0,1] \rightarrow \mathbb{R}$ that induces the integral operator $T_k: L^2([0,1]) \rightarrow L^2([0,1])$, $$ (T_k f)(u) = \int_0^1 k(u,v) ...
Hari.M.S.'s user avatar
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1 answer
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What is the correct formula of the kernel of the A$^*$A

If the kernel of the linear integral operator A on L$^2$(0,1) where A is a linear bounded integral operator non self adjoint? Thanks.
user930740's user avatar
1 vote
0 answers
104 views

A Schwartz kernel theorem for locally compact groups?

I am working through the paper A General Theory of Equivariant CNNs on Homogeneous Spaces. The paper is primarily aimed at a computer science audience. Here is the setting: we have a locally compact ...
ruthra's user avatar
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0 votes
1 answer
109 views

Showing that $||K^nf||_p \leq \frac{1}{n!}||k||_\infty^n ||f||_p$ where $K$ is the integral operator coming from the kernel $k(x,y) = \max\{0,x-y\}$

Here is what is written in my notes: $\bf{Remark.}$ There are quite a few ways to manufacture operators that contain only $0$ in the spectrum: Let $I = [0,1]$ and let $k \in \mathcal{C}(I^2)$ such ...
rosemary 2.0's user avatar
1 vote
0 answers
160 views

Hilbert-Schmidt Integral Operator with Missing Eigenfunctions

I'm having some issues with the spectral decomposition of the integral operator \begin{equation} (Af)(x)=\int_0^1|x-y|f(y)dy,\text{ with $f\in L^2[0,1]$}. \end{equation} Since \begin{equation} ...
Evan Gorman's user avatar
1 vote
1 answer
62 views

Pullback of integral kernel operator: how to remember the formula?

Every once in a while I have to rederive the formula for the pullback of a Euclidean integral kernel operator by a diffeomorphism. Let me focus on a simple case to make the discussion concrete. ...
Mike F's user avatar
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1 vote
1 answer
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Prove the operator $\int_0^x (x-t)f(t)dt$ is well defined.

Consider the operator $T : C[0,1] \to C[0,1] $ ($C[0,1]$ has the maximum metric) defined as $$T(f)=\int_0^x (x-t)f(t)dt$$ Prove that $T$ is well defined. So essentially what I want to prove is that $...
paradox's user avatar
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6 votes
2 answers
456 views

Integration is a compact operator on $L^p([0, 1])$

Let $p \in [1, \infty]$. I want to prove that this integral operator is compact: $$ T_p: L^p([0, 1]) \to L^p([0, 1]), \quad T(f(x)) := \int_0^x f(t)dt $$ I can prove it for $L_1$ case and I can prove ...
brokoner12's user avatar
0 votes
1 answer
45 views

Proving an expression for $T^n.$

Let $\mathcal H = L^2[0,1].$ Define an operator $T : \mathcal H \longrightarrow \mathcal H$ by $Tf(x) = \displaystyle {\int_{0}^{x} f(y)\ dy.}$ Show that for all $n \geq 1$ $$T^n f(x) = \int_{0}^{x} \...
Anacardium's user avatar
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