Add to ORKGA system of quasilinear non-uniformly parabolic-elliptic equations modelling chemotaxis and taking into account the volume filling effect is studied under no-flux boundary conditions. The proof of existence and uniqueness of a global-in-time weak solution is given. First the local solutions are constructed. This is done by the Schauder fixed point theorem. Uniqueness is proved with the use of the duality method. A priori estimates are stated either in the case when the Lyapunov functional is bounded from below or chemotactic forces are suitably weakened.Marie Curie Research Training Networ
This paper deals with a system of two coupled partial differential equations arising in chemotaxis, ...
This paper deals with a system of two coupled partial differential equations arising in chemotaxis, ...
We study a parabolic–elliptic chemotactic system describing the evolution of a population’s density ...
A system of quasilinear non-uniformly parabolic-elliptic equations modelling chemotaxis and taking i...
AbstractA system of quasilinear nonuniformly parabolic equations modelling chemotaxis and taking int...
AbstractA system of quasilinear nonuniformly parabolic equations modelling chemotaxis and taking int...
This paper is concerned with global solvability of a fully parabolic system of Keller--Segel-type in...
This paper deals with a nonlinear system of parabolic-elliptic type with a logistic source term and ...
AbstractIn this paper, we study a quasilinear nonuniform parabolic system modelling chemotaxis and t...
19 pagesInternational audienceAbstract: This paper is devoted to the analysis of non-negative soluti...
A system of quasi-linear parabolic and elliptic-parabolic equations describing chemotaxis is studied...
In this paper we study the zero-flux chemotaxis-system{ut=Δu−χ∇⋅(uv∇v)vt=Δv−f(u)v in a smooth and bo...
We study a parabolic–elliptic chemotactic system describing the evolution of a population’s density ...
In this paper we study the zero-flux chemotaxis-system{ut=Δu−χ∇⋅(uv∇v)vt=Δv−f(u)v in a smooth and bo...
We consider classical solutions to the chemotaxis system with logistic source $f(u) := au-\mu u^2$ u...
This paper deals with a system of two coupled partial differential equations arising in chemotaxis, ...
This paper deals with a system of two coupled partial differential equations arising in chemotaxis, ...
We study a parabolic–elliptic chemotactic system describing the evolution of a population’s density ...
A system of quasilinear non-uniformly parabolic-elliptic equations modelling chemotaxis and taking i...
AbstractA system of quasilinear nonuniformly parabolic equations modelling chemotaxis and taking int...
AbstractA system of quasilinear nonuniformly parabolic equations modelling chemotaxis and taking int...
This paper is concerned with global solvability of a fully parabolic system of Keller--Segel-type in...
This paper deals with a nonlinear system of parabolic-elliptic type with a logistic source term and ...
AbstractIn this paper, we study a quasilinear nonuniform parabolic system modelling chemotaxis and t...
19 pagesInternational audienceAbstract: This paper is devoted to the analysis of non-negative soluti...
A system of quasi-linear parabolic and elliptic-parabolic equations describing chemotaxis is studied...
In this paper we study the zero-flux chemotaxis-system{ut=Δu−χ∇⋅(uv∇v)vt=Δv−f(u)v in a smooth and bo...
We study a parabolic–elliptic chemotactic system describing the evolution of a population’s density ...
In this paper we study the zero-flux chemotaxis-system{ut=Δu−χ∇⋅(uv∇v)vt=Δv−f(u)v in a smooth and bo...
We consider classical solutions to the chemotaxis system with logistic source $f(u) := au-\mu u^2$ u...
This paper deals with a system of two coupled partial differential equations arising in chemotaxis, ...
This paper deals with a system of two coupled partial differential equations arising in chemotaxis, ...
We study a parabolic–elliptic chemotactic system describing the evolution of a population’s density ...