Questions tagged [integral-operators]
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Is homotopy invariance of the Leray-Schauder fixed point index for compact and compactly fixed maps false?
In Theorem (3.4) page 311 of the book 'Fixed Point Theory' by Granas and Dugundji (see also the paper 'The Leray-Schauder index and the fixed point theory for arbitrary ANRs') Granas defines a Leray-...
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Bernstein type representation with logarithmic kernel
Consider the integral operator $T$ which maps nonnegative measures $\mu$ on $\mathbb{R}_{\geq 0}^2$ such that $$\int_0^\infty\int_0^\infty\left|\ln(ux+vy)\right|\,d\mu(u,v)<+\infty$$ into functions ...
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Majorization theory on $\sigma$-finite 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 a finite measure spaces but I'm ...
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No jump of hypersingular integral near boundary under lower regularity
Let $\Gamma \subset \mathbb{R}^2 $ be a $C^2 $ smooth simple closed curve, the elasticity double layer potential on $\Gamma $ is defined as
$$
(Wu)(x):= \int_\Gamma (T(\partial_y,n(y))E(x,y))^T u(y) ...
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Transform connecting powers of integration and differentiation operators
Just by a chance, I found the following power series identity, which holds for any analytic function $F(\cdot)$, nonnegative integer $m$, and constants $u,v$ not depending on indeterminates $z,t$:
$$\...
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Understanding relation of 2 dependent, integral equations which are nested in a Bayesian Expectation
I'm trying hard to try understand the recursive nature between two equations in a recent macroeconomics paper, but my question mainly relates to how mathematically such recursive equations can depend ...
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About Fourier integral operators
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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Characterization of the Picard's condition for integral equation
Picard's condition (Thm. 15.18, Kress et al. 1989) is essential to study the existence of a solution of a Fredholm integral equation of the first kind. Specifically, consider (the univariate case) the ...
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Existence of solutions to n-dimensional integral equation with solutions into [0,1]
I have a research problem I am working on where a step involves proving the existence of solutions to a certain kind of integral equation. A statement of this problem is as below. I would appreciate ...
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Derivative of a functional involving integral and level set
Let $\Omega$ be a bounded smooth domain. For $u\colon \Omega \to \mathbb{R}$, define the functional
$$F(u) = \int_{\{u=0\}}g(x) \; \mathrm{d}x$$
where eg. $u \in H^2(\Omega) \cap C^0(\bar\Omega)$ and ...
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How to find the inverse of a product of two integral equations
Problem
I am trying to invert an equation of the form:
$R(l_0)=(\int_{0}^{l_0} \rho(x) \, dx)(\int_{l_0}^{l} \rho(x) \, dx)$
where $0\leq l_0 \leq l$
I.e. I want to find $\rho(x)$ given $R(l_0)$ via ...
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Why is this function in $L^1$?
I had a question about a claim made in the paper "Group Invariant Scattering" and why it is true. Consider the function $h_j(x) = 2^{nj}\psi(2^jx)$, where $\psi$ is a function such that $\...
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Solution or approximation to $\int x^{-a} \Gamma\left( b, c x^{-d} + e \right) dx$
I'm looking for a solution or approximation to the following indefinite integral $$\int x^{-a} \Gamma\left( b, c x^{-d} + e \right) dx.$$
I've tried Mathematica, but it does not converge to a solution....
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Reference request: trace norm estimate
In a paper I am currently reading, the author uses that if $T$ is an operator given by the kernel $$T(x,y) = \int_{\mathbb R} p(x,z) q(z,y) dz,$$
then $$\lvert \operatorname{tr} T \rvert \leq \lVert T ...
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When integrating by part produces a singularity
I'm currently interesting in the following operator:
$$O[f](x):=f(x)-2xe^{x^2}\int_x^{+\infty}dt \, e^{-t^2} f(t)$$ for all $x\in\mathbb{R}$ and $f$ smooth and decaying at infinity fast enough with ...
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