Structured population models on Polish spaces: A unified approach including graphs, Riemannian manifolds and measure spaces to describe dynamics of heterogeneous populations

Düll, Christian; Gwiazda, Piotr; Marciniak-Czochra, Anna; Skrzeczkowski, Jakub

doi:10.1142/s0218202524400037

Math. Models Methods Appl. Sci.

2023

DOI: 10.1142/s0218202524400037

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Structured population models on Polish spaces: A unified approach including graphs, Riemannian manifolds and measure spaces to describe dynamics of heterogeneous populations

Christian Düll,

Piotr Gwiazda,

Anna Marciniak-Czochra

et al.

Abstract: This paper presents a mathematical framework for modeling the dynamics of heterogeneous populations. Models describing local and non-local growth and transport processes appear in a variety of applications, such as crowd dynamics, tissue regeneration, cancer development and coagulation-fragmentation processes. The diverse applications pose a common challenge to mathematicians due to the multiscale nature of the structures that underlie the system’s self-organization and control. Similar abstract mathematical p… Show more

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Cited by 3 publications

References 73 publications

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Surveys and essays towards research perspectives on complex systems

Bellomo,

Brezzi

2023

Math. Models Methods Appl. Sci.

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This editorial is dedicated to presenting the papers published in a special issue focused on modeling, qualitative analysis and simulation of the collective dynamics of systems in engineering and life sciences. All papers have a minor or major reference to living, i.e. complex systems, and a critical analysis of the overall content of the issue is proposed, leading to a forward look at research perspectives. This paper first defines the goals of the issue. Then, a brief description of the scientific contribution of the papers published in this issue is given. Finally, a look into the future is proposed.

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Surveys and essays towards research perspectives on complex systems

Bellomo,

Brezzi

2023

Math. Models Methods Appl. Sci.

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Epidemics and society — A multiscale vision from the small world to the globally interconnected world

Burini,

Knopoff

2024

Math. Models Methods Appl. Sci.

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This paper shows how a new theory of epidemics can be developed for viral pandemics in a globally interconnected world. The study of the in-host dynamics and, in parallel, the spatial diffusion of epidemics defines the goal of our work, which looks ahead to new mathematical tools to model epidemics beyond the traditional approach of population dynamics. The approach takes into account the evolutionary nature of the virus, which can generate pseudo-Darwinian mutations and selection, while learning the presence of the virus and activating adaptive immunity. The study of immune competition plays a key role in both the in-host dynamics and the contagion dynamics.

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Lyapunov stability for measure differential equations

D’Apice,

Manzo,

Piccoli

et al. 2024

MCRF

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Recently, the concept of measure differential equation was introduced in [17]. Such a concept allows for deterministic modeling of uncertainty, finite-speed diffusion, concentration, and other phenomena. Moreover, it represents a natural generalization of ordinary differential equations to measures.In this paper, we deal with the stability of fixed points for measure differential equations. In particular, we discuss two concepts related to classical Lyapunov stability in terms of measure support and first moment. The two concepts are not comparable, but the latter implies the former if the measure differential equation is defined by an ordinary one. Finally, we provide results concerning Lyapunov functions.

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Structured population models on Polish spaces: A unified approach including graphs, Riemannian manifolds and measure spaces to describe dynamics of heterogeneous populations

Cited by 3 publications

References 73 publications

Surveys and essays towards research perspectives on complex systems

Surveys and essays towards research perspectives on complex systems

Epidemics and society — A multiscale vision from the small world to the globally interconnected world

Lyapunov stability for measure differential equations

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