Saved in:
Bibliographic Details
Main Authors: Bect, Julien, Georg, Niklas, Römer, Ulrich, Schöps, Sebastian
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2307.13484
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866909401755942912
author Bect, Julien
Georg, Niklas
Römer, Ulrich
Schöps, Sebastian
author_facet Bect, Julien
Georg, Niklas
Römer, Ulrich
Schöps, Sebastian
contents This work is concerned with the kernel-based approximation of a complex-valued function from data, where the frequency response function of a partial differential equation in the frequency domain is of particular interest. In this setting, kernel methods are employed more and more frequently, however, standard kernels do not perform well. Moreover, the role and mathematical implications of the underlying pair of kernels, which arises naturally in the complex-valued case, remain to be addressed. We introduce new reproducing kernel Hilbert spaces of complex-valued functions, and formulate the problem of complex-valued interpolation with a kernel pair as minimum norm interpolation in these spaces. Moreover, we combine the interpolant with a low-order rational function, where the order is adaptively selected based on a new model selection criterion. Numerical results on examples from different fields, including electromagnetics and acoustic examples, illustrate the performance of the method, also in comparison to available rational approximation methods.
format Preprint
id arxiv_https___arxiv_org_abs_2307_13484
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Rational kernel-based interpolation for complex-valued frequency response functions
Bect, Julien
Georg, Niklas
Römer, Ulrich
Schöps, Sebastian
Computational Engineering, Finance, and Science
Machine Learning
Numerical Analysis
This work is concerned with the kernel-based approximation of a complex-valued function from data, where the frequency response function of a partial differential equation in the frequency domain is of particular interest. In this setting, kernel methods are employed more and more frequently, however, standard kernels do not perform well. Moreover, the role and mathematical implications of the underlying pair of kernels, which arises naturally in the complex-valued case, remain to be addressed. We introduce new reproducing kernel Hilbert spaces of complex-valued functions, and formulate the problem of complex-valued interpolation with a kernel pair as minimum norm interpolation in these spaces. Moreover, we combine the interpolant with a low-order rational function, where the order is adaptively selected based on a new model selection criterion. Numerical results on examples from different fields, including electromagnetics and acoustic examples, illustrate the performance of the method, also in comparison to available rational approximation methods.
title Rational kernel-based interpolation for complex-valued frequency response functions
topic Computational Engineering, Finance, and Science
Machine Learning
Numerical Analysis
url https://arxiv.org/abs/2307.13484