Abstract:
We prove that, at regular values lying in a region of generalized strong convergence,
the resolvent kernels corresponding to a continuous bi-Carleman kernel
vanishing at infinity can be expressed as uniform limits of sequences of
resolvent kernels associated with its approximating Hilbert-Schmidt-type subkernels.
Key words:linear integral equation of the second kind,
bounded integral linear operator,
Fredholm resolvent,
resolvent kernel,
bi-Carleman kernel,
Hilbert-Schmidt kernel,
nuclear operator,
regular value,
characteristic set.
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