![SOLVED: Let 2 be bounded. simply-connected domain Let K(s') € L?() x2) be symmetric kernel: Define the Hilbert-Schmidt Integral operator Af == J K6y) f(y)dy: Prove that Ais a bounded linear and SOLVED: Let 2 be bounded. simply-connected domain Let K(s') € L?() x2) be symmetric kernel: Define the Hilbert-Schmidt Integral operator Af == J K6y) f(y)dy: Prove that Ais a bounded linear and](https://cdn.numerade.com/ask_images/5cec7b1b2d7b494ba0cf9c73b2eb1795.jpg)
SOLVED: Let 2 be bounded. simply-connected domain Let K(s') € L?() x2) be symmetric kernel: Define the Hilbert-Schmidt Integral operator Af == J K6y) f(y)dy: Prove that Ais a bounded linear and
SOME INTEGRAL OPERATORS ACTING ON H∞ 1. Introduction Let D denote the unit disk {z : |z| < 1} and H(D) the set of analytic
Construction of compact-integral operators on BC(Ω) with application to the solvability of functional integral equations
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Sam Walters ☕️ on Twitter: "Compact operators on Hilbert space were mentioned a few tweets ago. Here is a concrete example of them, and an application they afford on the nature of
![Jonathan Frankle on Twitter: "@AxlerLinear Thank you for making me laugh about compact operators in page 314 of your book (and for helping me survive functional analysis)! https://t.co/UQ8LMWeU7s" / Twitter Jonathan Frankle on Twitter: "@AxlerLinear Thank you for making me laugh about compact operators in page 314 of your book (and for helping me survive functional analysis)! https://t.co/UQ8LMWeU7s" / Twitter](https://pbs.twimg.com/media/EUtbq7zXQAMdcxL.jpg:large)
Jonathan Frankle on Twitter: "@AxlerLinear Thank you for making me laugh about compact operators in page 314 of your book (and for helping me survive functional analysis)! https://t.co/UQ8LMWeU7s" / Twitter
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PDF) Error bounds for L1 galerkin approximations of weakly singular integral operators | M. Ahues - Academia.edu
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