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Main Authors: Król, Sebastian, Sarnowski, Jarosław
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2301.12451
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author Król, Sebastian
Sarnowski, Jarosław
author_facet Król, Sebastian
Sarnowski, Jarosław
contents By methods of harmonic analysis, we identify large classes of Banach spaces invariant of periodic Fourier multipliers with symbols satisfying the classical Marcinkiewicz type conditions. Such classes include general (vector-valued) Banach function spaces $Φ$ and/or the scales of Besov and Triebel-Lizorkin spaces defined on the basis of $Φ$. We apply these results to the study of the well-posedness and maximal regularity property of an abstract second-order integro-differential equation, which models various types of elliptic and parabolic problems arising in different areas of applied mathematics. In particular, under suitable conditions imposed on a convolutor $c$ and the geometry of an underlying Banach space $X$, we characterize the conditions on the operators $A$, $B$ and $P$ on $X$ such that the following periodic problem ${\partial P} {\partial u} + B {\partial u} + A u + c \ast u = f \qquad \textrm{in } \mathcal{D}'(\mathbb{T}; X)$ is well-posed with respect to large classes of function spaces. The obtained results extend the known theory on the maximal regularity of such problem.
format Preprint
id arxiv_https___arxiv_org_abs_2301_12451
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle The invariant subspaces of periodic Fourier multipliers with application to abstract evolution equations
Król, Sebastian
Sarnowski, Jarosław
Functional Analysis
By methods of harmonic analysis, we identify large classes of Banach spaces invariant of periodic Fourier multipliers with symbols satisfying the classical Marcinkiewicz type conditions. Such classes include general (vector-valued) Banach function spaces $Φ$ and/or the scales of Besov and Triebel-Lizorkin spaces defined on the basis of $Φ$. We apply these results to the study of the well-posedness and maximal regularity property of an abstract second-order integro-differential equation, which models various types of elliptic and parabolic problems arising in different areas of applied mathematics. In particular, under suitable conditions imposed on a convolutor $c$ and the geometry of an underlying Banach space $X$, we characterize the conditions on the operators $A$, $B$ and $P$ on $X$ such that the following periodic problem ${\partial P} {\partial u} + B {\partial u} + A u + c \ast u = f \qquad \textrm{in } \mathcal{D}'(\mathbb{T}; X)$ is well-posed with respect to large classes of function spaces. The obtained results extend the known theory on the maximal regularity of such problem.
title The invariant subspaces of periodic Fourier multipliers with application to abstract evolution equations
topic Functional Analysis
url https://arxiv.org/abs/2301.12451