Singular p-homogenization for highly conductive fractal layers

Abstract

We consider a quasi-linear homogenization problem in a two-dimensional pre-fractal domain n, for n∈N, surrounded by thick fibers of amplitude . We introduce a sequence of "pre-homogenized" energy functionals and we prove that this sequence converges in a suitable sense to a quasi-linear fractal energy functional involving a p-energy on the fractal boundary. We prove existence and uniqueness results for (quasi-linear) pre-homogenized and homogenized fractal problems. The convergence of the solutions is also investigated.