Proteus mirabilis are bacteria that make strikingly regular spatial-temporal patterns on agar surfaces. In this paper we investigate a mathematical model that has been shown to display these structures when solved numerically. The model consists of an ordinary differential equation coupled with a partial differential equation involving a first-order hyperbolic aging term together with nonlinear degenerate diffusion. The system is shown to admit global weak solutions
A nonlinear, density-dependent system of diffusion-reaction equations describing development of bact...
A nonlinear, density-dependent system of diffusion-reaction equations describing development of bact...
A model of tumor growth into surrounding tissue is analyzed. The model consists of a system of nonli...
Proteus mirabilis are bacteria that make strikingly regular spatial-temporal patterns on agar surfac...
AbstractWe prove a global existence result for a model describing the swarming phenomenon of the bac...
. This paper considers a system of coupled second order parabolic and first order hyperbolic equatio...
In this paper we present continuous age- and space-structured models and numerical computations of P...
We study a reaction diffusion model recently proposed in [5] to describe the spatiotemporal evolutio...
A diffusion-reaction model for the growth of bacterial colonies is presented. The often observed coo...
Abstract. The aim of this work is to study a model of age-structured population with two time scales...
A model focusing on key components involved in tumour invasion is studied. Tumour cell migration is ...
AbstractA model is presented for a single species population moving in a limited one-dimensional env...
Most bacteria live in biofilm communities, which offer protection against harmful external impacts. ...
We introduce and analyze a prototype model for chemotactic effects in biofilm formation. The model i...
In the deterministic continuum modelling of biofilms arise systems of degenerate parabolic equations...
A nonlinear, density-dependent system of diffusion-reaction equations describing development of bact...
A nonlinear, density-dependent system of diffusion-reaction equations describing development of bact...
A model of tumor growth into surrounding tissue is analyzed. The model consists of a system of nonli...
Proteus mirabilis are bacteria that make strikingly regular spatial-temporal patterns on agar surfac...
AbstractWe prove a global existence result for a model describing the swarming phenomenon of the bac...
. This paper considers a system of coupled second order parabolic and first order hyperbolic equatio...
In this paper we present continuous age- and space-structured models and numerical computations of P...
We study a reaction diffusion model recently proposed in [5] to describe the spatiotemporal evolutio...
A diffusion-reaction model for the growth of bacterial colonies is presented. The often observed coo...
Abstract. The aim of this work is to study a model of age-structured population with two time scales...
A model focusing on key components involved in tumour invasion is studied. Tumour cell migration is ...
AbstractA model is presented for a single species population moving in a limited one-dimensional env...
Most bacteria live in biofilm communities, which offer protection against harmful external impacts. ...
We introduce and analyze a prototype model for chemotactic effects in biofilm formation. The model i...
In the deterministic continuum modelling of biofilms arise systems of degenerate parabolic equations...
A nonlinear, density-dependent system of diffusion-reaction equations describing development of bact...
A nonlinear, density-dependent system of diffusion-reaction equations describing development of bact...
A model of tumor growth into surrounding tissue is analyzed. The model consists of a system of nonli...
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