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Main Authors: Malaguti, Luisa, Perrotta, Stefania
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.12943
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author Malaguti, Luisa
Perrotta, Stefania
author_facet Malaguti, Luisa
Perrotta, Stefania
contents This paper is devoted to the study of an age-structured SIRS epidemic model, in which a population affected by a disease is divided into susceptible, infected, and removed individuals. We assume that the force of infection may be nonlinear and time-dependent. The model, originally introduced and studied by Iannelli and his co-authors, can be naturally formulated in an abstract setting and has traditionally been analyzed using fixed point techniques, most often the Banach contraction principle. Following the approaches of Inaba and Banasiak, our investigation is based on the semigroup theory, through which we study the existence of mild (integral) solutions. The main novelty of our work lies in the use of the topological degree for condensing maps instead of classical fixed-point arguments. We prove the existence of a unique, global, nonnegative solution to the model that satisfies the prescribed initial and nonlocal conditions and takes values in the space $L^1$ with respect to the age variable. Moreover, this solution depends continuously on the initial data.
format Preprint
id arxiv_https___arxiv_org_abs_2603_12943
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Topological Degree Methods for Age-Structured Epidemic Models
Malaguti, Luisa
Perrotta, Stefania
Analysis of PDEs
This paper is devoted to the study of an age-structured SIRS epidemic model, in which a population affected by a disease is divided into susceptible, infected, and removed individuals. We assume that the force of infection may be nonlinear and time-dependent. The model, originally introduced and studied by Iannelli and his co-authors, can be naturally formulated in an abstract setting and has traditionally been analyzed using fixed point techniques, most often the Banach contraction principle. Following the approaches of Inaba and Banasiak, our investigation is based on the semigroup theory, through which we study the existence of mild (integral) solutions. The main novelty of our work lies in the use of the topological degree for condensing maps instead of classical fixed-point arguments. We prove the existence of a unique, global, nonnegative solution to the model that satisfies the prescribed initial and nonlocal conditions and takes values in the space $L^1$ with respect to the age variable. Moreover, this solution depends continuously on the initial data.
title Topological Degree Methods for Age-Structured Epidemic Models
topic Analysis of PDEs
url https://arxiv.org/abs/2603.12943