On a diffraction problem for strongly nonlinear equations (Q5899807)

By the monotonicity method the author proves the existence and the uniqueness of the generalized solutions of the transmission problem for the equation \[ -\sum^{n}_{i=1}\partial /\partial x_ i(| \partial u/\partial x_ i|^{p_ k-2}(\partial u/\partial x_ i))=f(x),\quad p_ k>2,\quad k=1,...,\ell, \] in the n-dimensional domain \(\Omega\), consisting of \(\ell\) components \(\Omega_ k\), having \(C^ 2\)-smooth boundaries, under the Dirichlet boundary condition on the outermost boundary and the nonlinear transmission conditions on the interfaces being the surfaces of discontinuity of the nonlinear coefficients of the equation.