We briefly review hyperbolic and kinetic models for self-organized biological aggregations and traffic-like movement. We begin with the simplest models described by an advection-reaction equation in one spatial dimension. We then increase the complexity of models in steps. To this end, we begin investigating local hyperbolic systems of conservation laws with constant velocity. Next, we proceed to investigate local hyperbolic systems with density-dependent speed, systems that consider population dynamics (i.e., birth and death processes), and nonlocal hyperbolic systems. We conclude by discussing kinetic models in two spatial dimensions and their limiting hyperbolic models. This structural approach allows us to discuss the complexity of the ...
Communicated by P. K. Maini Summary. Morphogenetic processes such as neurulation and gastrulation in...
This thesis tackles the challenging aim of developing a mathematical theory of living systems with f...
AbstractThis paper presents an asymptotic theory, based on the hyperbolic scaling, for a large class...
We briefly review hyperbolic and kinetic models for self-organized biological aggregations and traff...
This book focuses on the spatio-temporal patterns generated by two classes of mathematical models (o...
This book focuses on the spatio-temporal patterns generated by two classes of mathematical models (o...
In this article, we introduce and study a new nonlocal hyperbolic model for the formation and moveme...
Various classes of Partial Differential Equations have shown to be successful in describing the self...
In this thesis, we study a nonlocal hyperbolic model for biological aggregations in one spatial dime...
The modelling and investigation of complex spatial and spatio-temporal patterns exhibited by a vario...
The formation, persistence and movement of self-organised biological aggregations are medi...
The last two decades have seen a surge in kinetic and macroscopic models derived to investigate the ...
We consider the development of hyperbolic transport models for the propagation in space of an epidem...
The study of self-organised collective animal behaviour, such as swarms of insects or schools of fis...
Communicated by P. K. Maini Summary. Morphogenetic processes such as neurulation and gastrulation in...
This thesis tackles the challenging aim of developing a mathematical theory of living systems with f...
AbstractThis paper presents an asymptotic theory, based on the hyperbolic scaling, for a large class...
We briefly review hyperbolic and kinetic models for self-organized biological aggregations and traff...
This book focuses on the spatio-temporal patterns generated by two classes of mathematical models (o...
This book focuses on the spatio-temporal patterns generated by two classes of mathematical models (o...
In this article, we introduce and study a new nonlocal hyperbolic model for the formation and moveme...
Various classes of Partial Differential Equations have shown to be successful in describing the self...
In this thesis, we study a nonlocal hyperbolic model for biological aggregations in one spatial dime...
The modelling and investigation of complex spatial and spatio-temporal patterns exhibited by a vario...
The formation, persistence and movement of self-organised biological aggregations are medi...
The last two decades have seen a surge in kinetic and macroscopic models derived to investigate the ...
We consider the development of hyperbolic transport models for the propagation in space of an epidem...
The study of self-organised collective animal behaviour, such as swarms of insects or schools of fis...
Communicated by P. K. Maini Summary. Morphogenetic processes such as neurulation and gastrulation in...
This thesis tackles the challenging aim of developing a mathematical theory of living systems with f...
AbstractThis paper presents an asymptotic theory, based on the hyperbolic scaling, for a large class...