@Article{ATA-33-1, author = {}, title = {Entropy Unilateral Solution for Some Noncoercive Nonlinear Parabolic Problems via a Sequence of Penalized Equations}, journal = {Analysis in Theory and Applications}, year = {2017}, volume = {33}, number = {1}, pages = {29--45}, abstract = {

We give an existence result of the obstacle parabolic equations $$\frac{\partial b(x,u)}{\partial t} -div(a(x,t,u,\nabla u))+div(\phi(x,t,u)) =f\quad \text{in}\ \ Q_T,$$ where $b(x,u)$ is bounded function of $u$, the term $- {\rm div}(a(x,t,u,\nabla u))$ is a Leray-Lions type operator and the function $\phi$ is a nonlinear lower order and satisfy only the growth condition. The second term $f$  belongs to $L^{1}(Q_T)$. The proof of an existence solution is based on the penalization methods.

}, issn = {1573-8175}, doi = {https://doi.org/10.4208/ata.2017.v33.n1.4}, url = {https://global-sci.com/article/73881/entropy-unilateral-solution-for-some-noncoercive-nonlinear-parabolic-problems-via-a-sequence-of-penalized-equations} }