Approximate Diagonal Integral Representations and Eigenmeasures for Lipschitz Operators on Banach Spaces

Approximate Diagonal Integral Representations and Eigenmeasures for Lipschitz Operators on Banach Spaces

A new stochastic approach for the approximation of (nonlinear) Lipschitz operators in normed spaces by their eigenvectors is shown. Different ways of providing integral representations for these approximations are proposed, depending on the properties of the operators themselves whether they are loc...

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Bibliographic Details
Published in:Mathematics (Basel) Vol. 10; no. 2; p. 220
Main Authors: Erdoğan, Ezgi, Sánchez Pérez, Enrique A.
Format: Journal Article
Language:English
Published: Basel MDPI AG 01-01-2022
Subjects:
Approximation
banach space
Banach spaces
Computational mathematics
Concrete
Convexity
eigenmeasure
eigenvalue
Eigenvalues
Eigenvectors
Food science
operators
Operators (mathematics)
Quantum physics
Representations
spectral function
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Summary:A new stochastic approach for the approximation of (nonlinear) Lipschitz operators in normed spaces by their eigenvectors is shown. Different ways of providing integral representations for these approximations are proposed, depending on the properties of the operators themselves whether they are locally constant, (almost) linear, or convex. We use the recently introduced notion of eigenmeasure and focus attention on procedures for extending a function for which the eigenvectors are known, to the whole space. We provide information on natural error bounds, thus giving some tools to measure to what extent the map can be considered diagonal with few errors. In particular, we show an approximate spectral theorem for Lipschitz operators that verify certain convexity properties.
ISSN:2227-7390
2227-7390
DOI:10.3390/math10020220