Spaces of measures and their applications to structured population models / Christian Düll, Piotr Gwiazda, Anna Marciniak-Czochra, Jakub Skrzeczkowski.
Düll, Christian| Call Number | 304.601/51 |
| Author | Düll, Christian, author. |
| Title | Spaces of measures and their applications to structured population models / Christian Düll, Piotr Gwiazda, Anna Marciniak-Czochra, Jakub Skrzeczkowski. |
| Physical Description | 1 online resource (xi, 308 pages) : digital, PDF file(s). |
| Series | Cambridge monographs on applied and computational mathematics ; 36 |
| Notes | Title from publisher's bibliographic system (viewed on 27 Sep 2021). |
| Contents | Analytical setting -- Structured population models on state space R -- Structured population models on proper spaces -- Numerical methods for structured population models -- Recent developments and future perspectives. |
| Summary | Structured population models are transport-type equations often applied to describe evolution of heterogeneous populations of biological cells, animals or humans, including phenomena such as crowd dynamics or pedestrian flows. This book introduces the mathematical underpinnings of these applications, providing a comprehensive analytical framework for structured population models in spaces of Radon measures. The unified approach allows for the study of transport processes on structures that are not vector spaces (such as traffic flow on graphs) and enables the analysis of the numerical algorithms used in applications. Presenting a coherent account of over a decade of research in the area, the text includes appendices outlining the necessary background material and discusses current trends in the theory, enabling graduate students to jump quickly into research. |
| Added Author | Gwiazda, Piotr, author. Marciniak-Czochra, Anna, author. Skrzeczkowski, Jakub, author. |
| Subject | Population Mathematical models. Functions of bounded variation. Lipschitz spaces. METRIC SPACES. Radon measures. Biology Mathematical models. |
| Multimedia |
Total Ratings:
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| Summary | Structured population models are transport-type equations often applied to describe evolution of heterogeneous populations of biological cells, animals or humans, including phenomena such as crowd dynamics or pedestrian flows. This book introduces the mathematical underpinnings of these applications, providing a comprehensive analytical framework for structured population models in spaces of Radon measures. The unified approach allows for the study of transport processes on structures that are not vector spaces (such as traffic flow on graphs) and enables the analysis of the numerical algorithms used in applications. Presenting a coherent account of over a decade of research in the area, the text includes appendices outlining the necessary background material and discusses current trends in the theory, enabling graduate students to jump quickly into research. |
| Notes | Title from publisher's bibliographic system (viewed on 27 Sep 2021). |
| Contents | Analytical setting -- Structured population models on state space R -- Structured population models on proper spaces -- Numerical methods for structured population models -- Recent developments and future perspectives. |
| Subject | Population Mathematical models. Functions of bounded variation. Lipschitz spaces. METRIC SPACES. Radon measures. Biology Mathematical models. |
| Multimedia |