Kernels of Integral Equations Can Be Boundedly Infinitely Differentiable on R2
Abstract
In this paper, we reduce the general linear integral equation of the third kind in L2(Y,μ), with largely arbitrary kernel and coefficient, to an equivalent integral equation either of the second kind or of the first kind in L2(R), with the kernel being the linear pencil of bounded infinitely differentiable bi-Carleman kernels expandable in absolutely and uniformly convergent bilinear series. The reduction is done by using unitary equivalence transformations.
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