@Article{IJNAM-12-4, author = {}, title = {An Interior Penalty Discontinuous Galerkin Method for a Class of Monotone Quasilinear Elliptic Problems}, journal = {International Journal of Numerical Analysis and Modeling}, year = {2015}, volume = {12}, number = {4}, pages = {750--777}, abstract = {
A family of interior penalty $hp$-discontinuous Galerkin methods is developed and analyzed for the numerical solution of the quasilinear elliptic equation $-\nabla \cdot (\rm{A}$ $(\nabla u)\nabla u)=f$ posed on the open bounded domain $\Omega\subset\mathbb{R}^d$, $d\geq2$. Subject to the assumption that the map $\rm{v}\mapsto \rm{A}(\rm{v})\rm{v}$, $\rm{v} \in \mathbb{R}^d$, is Lipschitz continuous and strongly monotone, it is proved that the proposed method is well-posed. A priori error estimates are presented of the error in the broken $H^1(\Omega)$-norm, exhibiting precisely the same $h$-optimal and mildly $p$-suboptimal convergence rates as obtained for the interior penalty approximation of linear elliptic problems. A priori estimates for linear functionals of the error and the $L^2(\Omega)$-norm of the error are also established and shown to be $h$-optimal for a particular member of the proposed family of methods. The analysis is completed under fairly weak conditions on the approximation space, allowing for non-affine and curved elements with multilevel hanging nodes. The theoretical results are verified by numerical experiments.
}, issn = {2617-8710}, doi = {https://doi.org/2015-IJNAM-510}, url = {https://global-sci.com/article/83316/an-interior-penalty-discontinuous-galerkin-method-for-a-class-of-monotone-quasilinear-elliptic-problems} }