Semigroups For Initial-Boundary Value Problems

Marjeta Kramar; Delio Mugnolo; Rainer Nagel

arXiv:2512.01966·math.AP·December 2, 2025

Semigroups For Initial-Boundary Value Problems

Marjeta Kramar, Delio Mugnolo, Rainer Nagel

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TL;DR

This paper reviews the theory of one-sided coupled operator matrices, emphasizing their application to evolution equations with inhomogeneous boundary conditions, providing a comprehensive overview of the mathematical framework involved.

Contribution

It offers a systematic review of the theory related to coupled operator matrices and their role in solving evolution equations with complex boundary conditions.

Findings

01

Clarifies the mathematical structure of coupled operator matrices.

02

Highlights their application to boundary value problems.

03

Provides insights into solving evolution equations with inhomogeneous boundaries.

Abstract

We review the theory of one-sided coupled operator matrices with a focus on evolution equations with inhomogeneous boundary conditions. (The original article had no abstract.)

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Taxonomy

TopicsNonlinear Differential Equations Analysis · Spectral Theory in Mathematical Physics · Stability and Controllability of Differential Equations