Finite energy solutions of nonlinear Dirichlet problems with discontinuous coefficients (Q2910080)

The author studies existence and uniqueness of weak solutions of the following nonlinear boundary problem NEWLINE\[NEWLINE \begin{cases} -\text{div}(a(x,\nabla u))=-\text{div}(g(u)E(x)) + f(x) & \text{ in } \;\Omega,\\ u=0 & \text{ on } \;\partial\Omega, \end{cases} NEWLINE\]NEWLINE under the assumptions \(E\in(L^{N/(p-1)}(\Omega))^N,\) \(f\in L^m(\Omega)\) and \(g(s)\) is a real continuous function such that \(|g(s)|\leq \gamma |s|^{p-1},\) \(\gamma>0.\)