On a parabolic-hyperbolic chemotaxis system with discontinuous data: Well-posedness, stability and regularity

Abstract: The global dynamics and regularity of parabolic-hyperbolic systems is an interesting topic in PDEs due to the coupling of competing dissipation and hyperbolic effects. This paper is concerned with the Cauchy problem of a parabolic-hyperbolic system derived from a chemotaxis model describing the dynamics of the initiation of tumor angiogenesis. It is shown that, as time tends to infinity, the Cauchy problem with large-amplitude discontinuous data admit global weak solutions which converge to a constant state (r… Show more

“…Then a series of works has been established for the transformed system (); we can summarize the results as follows: •Existence and stability of traveling wave solutions for $$$ \varepsilon =0 $$$ [11–20] and for $$$ \varepsilon >0 $$$ [10, 21, 22]. •Global dynamics of solutions in one‐dimensional space [23–28] and in higher spaces [29–38]. •Boundary layer problem [39–42].…”

“…• Global dynamics of solutions in one-dimensional space [23][24][25][26][27][28] and in higher spaces [29][30][31][32][33][34][35][36][37][38].…”

Nonlinear stability of strong traveling waves for a chemotaxis model with logarithmic sensitivity and periodic perturbations

“…Then a series of works has been established for the transformed system (); we can summarize the results as follows: •Existence and stability of traveling wave solutions for $$$ \varepsilon =0 $$$ [11–20] and for $$$ \varepsilon >0 $$$ [10, 21, 22]. •Global dynamics of solutions in one‐dimensional space [23–28] and in higher spaces [29–38]. •Boundary layer problem [39–42].…”

“…• Global dynamics of solutions in one-dimensional space [23][24][25][26][27][28] and in higher spaces [29][30][31][32][33][34][35][36][37][38].…”

Nonlinear stability of strong traveling waves for a chemotaxis model with logarithmic sensitivity and periodic perturbations

“…There has been a considerable amount of interesting works carried out for the transformed system (1.3). The one-dimensional problem has been first studied extensively from various aspects such as the traveling wave solutions [22,32,34,35,39,41,44], global dynamics of solutions in the whole space [12,30,37,49] or in the bounded interval [19,31,33,48]. For the multidimensional whole space R 2 , the nonlinear stability of planar traveling wave was recently established in [3].…”

Global weak solutions and asymptotics of a singular PDE-ODE chemotaxis system with discontinuous data

“…D describes the diffusivity of cell, χ and φ(V ) are chemotactic sensitivity coefficient and chemotactic sensitivity function, respectively, ≥ 0 denotes the chemical diffusion coefficient and the function g(U, V ) describes the chemical kinetics. Since then, this model has obtained a large amount of attention and came up with many related models [22,10,26,9,6,15,23,2,3,21]. Especially, when φ(V ) = ln V , g(U, V ) = −U V m , the model (1) becomes the logarithmic sensitively model as follows…”

Asymptotic behaviors and existence of traveling wave solutions to the Keller-Segel model with logarithmic sensitivity