Spectral Theorem for Self-Adjoint Partial Integral Operators in Kaplansky-Hilbert Modules
Functional Analysis
2025-12-09 v3
Abstract
In this paper, a spectral theorem is proved for self-adjoint cyclically compact partial integral operators in the space of functions with mixed norm, which is a Kaplansky--Hilbert module. The decomposition through eigenfunctions, integral representation using orthogonal projectors, and functional calculus are established. The results generalize Mercer theorem for positive definite kernels. The proofs rely on the gluing of projector-valued measures, presented in separate lemmas. An example illustrates all assertions of the theorem for a specific kernel and function.
Cite
@article{arxiv.2505.14837,
title = {Spectral Theorem for Self-Adjoint Partial Integral Operators in Kaplansky-Hilbert Modules},
author = {K. Kudaybergenov and A. Arziev and P. Orinbaev},
journal= {arXiv preprint arXiv:2505.14837},
year = {2025}
}
Comments
15 pages, in Russian language