AbstractThis paper presents an asymptotic theory for a large class of Boltzmann-type equations suitable to model the evolution of multicellular systems in biology. The mathematical approach described herein shows how various types of diffusion phenomena, linear and nonlinear, can be obtained in suitable asymptotic limits. Time scaling related to cell movement and biological activity are shown to play a crucial role in determining the macroscopic equations corresponding to each case
This paper deals with a critical analysis and some developments related to the mathema-tical literat...
International audienceTumor growth strictly depends on the interactions occurring at the cellular sc...
This paper deals with a critical analysis and some developments related to the mathema- tical liter...
AbstractThis paper presents an asymptotic theory for a large class of Boltzmann-type equations suita...
AbstractThis paper presents an asymptotic theory, based on the hyperbolic scaling, for a large class...
This paper deals with the analysis of the asymptotic limit towards the derivation of hyperbolic macr...
International audienceThis paper deals with the analysis of the asymptotic limit toward the derivati...
Cell migration and growth are essential components of the development of multicellular organisms. Th...
Abstract Cell migration and growth are essential components of the development of mul-ticellular org...
This paper deals with the derivation of macroscopic tissue models from the underlying description de...
This paper deal with the classical Boltzmann Equation generalized to model populations in complex bi...
The main theme of the thesis here proposed is given by the bio-physical phenomenon of aggregation. M...
This paper develops a variety of mathematical tools to model the dynamics of large systems of intera...
A competition-diffusion system, where populations of healthy and malignant cells compete and move on...
Along this work we will consider several models of partial differential equations that describe cell...
This paper deals with a critical analysis and some developments related to the mathema-tical literat...
International audienceTumor growth strictly depends on the interactions occurring at the cellular sc...
This paper deals with a critical analysis and some developments related to the mathema- tical liter...
AbstractThis paper presents an asymptotic theory for a large class of Boltzmann-type equations suita...
AbstractThis paper presents an asymptotic theory, based on the hyperbolic scaling, for a large class...
This paper deals with the analysis of the asymptotic limit towards the derivation of hyperbolic macr...
International audienceThis paper deals with the analysis of the asymptotic limit toward the derivati...
Cell migration and growth are essential components of the development of multicellular organisms. Th...
Abstract Cell migration and growth are essential components of the development of mul-ticellular org...
This paper deals with the derivation of macroscopic tissue models from the underlying description de...
This paper deal with the classical Boltzmann Equation generalized to model populations in complex bi...
The main theme of the thesis here proposed is given by the bio-physical phenomenon of aggregation. M...
This paper develops a variety of mathematical tools to model the dynamics of large systems of intera...
A competition-diffusion system, where populations of healthy and malignant cells compete and move on...
Along this work we will consider several models of partial differential equations that describe cell...
This paper deals with a critical analysis and some developments related to the mathema-tical literat...
International audienceTumor growth strictly depends on the interactions occurring at the cellular sc...
This paper deals with a critical analysis and some developments related to the mathema- tical liter...