Roth's theorems for matrix equations with symmetry constraints

Maxwell's equations for structures with arbitrary point symmetry groups are considered. It is shown that an initial boundary value problem for Maxwell's equations in a domain can be reduced to ∼N independent problems in a 1/N part of the initial domain, where N is the order of the symmetry group of

In this work we provide local bifurcation results for equations involving the p-Laplacian in balls. We analyze the continua C n of radial solutions emanating from (l n, p , 0), {l n, p } being the radial eigenvalues of -D p . First, we show that the only nontrivial solutions close to (l n, p , 0) li

We study the existence and uniqueness of the solution for a telegraph equation with integral condition. We apply the Rothe time discretization method, then we prove its convergence.

In this paper we study eigenvalue problems for hemivariational and variational inequalities driven by the p-Laplacian differential operator. Using topological methods (based on multivalued versions of the Leray-Schauder alternative principle) and variational methods (based on the nonsmooth critical