This talk concerns a hyperbolic model of cell-cell repulsion with a dynamics in the population of cells. More precisely, we consider a population of cells producing a field (the â pressureâ ) which induces a motion of the cells following the opposite of the gradient. The field indicates the local density of population and we assume that cells try to avoid crowded areas and prefer locally empty spaces which are far away from the carrying capacity. We analyze the well-posedness property of the associated Cauchy problem on the real line. We start from bounded initial conditions and we consider some invariant properties of the initial conditions such as the continuity, smoothness and monotony. We also describe in detail the behavior of the le...
We consider a mathematical model describing population dynamics of normal and abnormal cell densitie...
We consider a nonlinear system of partial differential equations which describes the dynamics of two...
We consider a simplified model of tumor angiogenesis, described by a Keller-Segel equation on the tw...
This talk concerns a hyperbolic model of cell-cell repulsion with a dynamics in the population of ce...
How can repulsive and attractive forces, acting on a conservative system, create stable traveling pa...
We show that there exist traveling wave solutions of the Keller-Segel-FKPP equation, which models a ...
We study the existence of travelling wave solutions of a one-dimensional parabolic-hyperbolic system...
Abstract. A simple model of chemotactic cell migration gives rise to travelling wave solutions. By v...
Mathematical models of bacterial populations are often written as systems of partial differential eq...
We are concerned with the hyperbolic Keller-Segel model with quorum sensing, a model describing the ...
Mathematical models of bacterial populations are often written as systems of partial differential eq...
We consider a hyperbolic-parabolic system arising from a chemotaxis model in tumor angiogenesis, whi...
Mathematical models of bacterial populations are often written as systems of partial differential eq...
International audienceFlux-limited Keller-Segel (FLKS) model has been recently derived from kinetic ...
We consider a one-dimensional system arising from a chemotaxis model in tumour angiogenesis, which i...
We consider a mathematical model describing population dynamics of normal and abnormal cell densitie...
We consider a nonlinear system of partial differential equations which describes the dynamics of two...
We consider a simplified model of tumor angiogenesis, described by a Keller-Segel equation on the tw...
This talk concerns a hyperbolic model of cell-cell repulsion with a dynamics in the population of ce...
How can repulsive and attractive forces, acting on a conservative system, create stable traveling pa...
We show that there exist traveling wave solutions of the Keller-Segel-FKPP equation, which models a ...
We study the existence of travelling wave solutions of a one-dimensional parabolic-hyperbolic system...
Abstract. A simple model of chemotactic cell migration gives rise to travelling wave solutions. By v...
Mathematical models of bacterial populations are often written as systems of partial differential eq...
We are concerned with the hyperbolic Keller-Segel model with quorum sensing, a model describing the ...
Mathematical models of bacterial populations are often written as systems of partial differential eq...
We consider a hyperbolic-parabolic system arising from a chemotaxis model in tumor angiogenesis, whi...
Mathematical models of bacterial populations are often written as systems of partial differential eq...
International audienceFlux-limited Keller-Segel (FLKS) model has been recently derived from kinetic ...
We consider a one-dimensional system arising from a chemotaxis model in tumour angiogenesis, which i...
We consider a mathematical model describing population dynamics of normal and abnormal cell densitie...
We consider a nonlinear system of partial differential equations which describes the dynamics of two...
We consider a simplified model of tumor angiogenesis, described by a Keller-Segel equation on the tw...