266 research outputs found
Analysis of a chemo-repulsion model with nonlinear production: The continuous problem and unconditionally energy stable fully discrete schemes
We consider the following repulsive-productive chemotaxis model: Let , find , the cell density, and , the chemical
concentration, satisfying \begin{equation}\label{C5:Am} \left\{ \begin{array}
[c]{lll} \partial_t u - \Delta u - \nabla\cdot (u\nabla v)=0 \ \ \mbox{in}\
\Omega,\ t>0,\\ \partial_t v - \Delta v + v = u^p \ \ \mbox{in}\ \Omega,\ t>0,
\end{array} \right. \end{equation} in a bounded domain , . By using a regularization technique, we prove the
existence of solutions of this problem. Moreover, we propose three fully
discrete Finite Element (FE) nonlinear approximations, where the first one is
defined in the variables , and the second and third ones by introducing
as an auxiliary variable. We prove some
unconditional properties such as mass-conservation, energy-stability and
solvability of the schemes. Finally, we compare the behavior of the schemes
throughout several numerical simulations and give some conclusions.Comment: arXiv admin note: substantial text overlap with arXiv:1807.0111
Reproductive solution for grade-two fluid model in two dimensions
We treat the existence of reproductive solution (weak periodic solution) of a second-grade fluid system in two dimensions, by using the Galerkin approximation method and compactness arguments.
We treat the existence of reproductive solution (weak periodic solution) of a second-grade fluid system in two dimensions, by using the Galerkin approximation method and compactness arguments. 
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