I'm currently working on this Dirichlet problem:

\begin{cases}
div(\sigma |\nabla u|^{p-2} \nabla u) = f &\quad  {in }~ \Omega\\
u = g &\quad in~\partial\Omega
\end{cases}

with $\sigma \in L^{\infty}_{+}(\Omega)$, boundary $g \in W^{1,p}(\Omega)$ and $f \in L^2(\Omega)$.

I think I've already proved that this problem has a unique solution, but I don't know how to prove the following a priori estimate

\begin{align}
||{u}||_{W^{1,p}} \leq C ({||g||}_{W^{1,p}} + {||f||}_{L^2}^{\frac{1}{p-1}})
\end{align}

This estimate is mentioned in this paper
https://pdfs.semanticscholar.org/7399/da07c625d51aa7ee72840789916b036019d2.pdf
(second page; equation (1.4))
but without giving proof. I guess it's seen "easy", but I just don't know how to get there. I know how to conclude an a priori estimate in the case $f=0$ or $g=0$, but since p-Laplace operator isn't linear, this doesn't help and I'm really clueless know. I hope someone can help me with with